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1951年に出版された統計関係書概観 (林知己夫) 04-117
戦後に出版された偏微分方程式に関する書物 (吉田耕作) 10-263
赤池弘次・中川東一郎:ダイナミックシステムの 統計的解析と制御(藤井光昭) 29-186
秋月康夫・鈴木通夫:高等代数学Ⅰ (玉河恒夫) 05-255
秋月康夫:調和積分論(一松 信)······· 08-060
秋月康夫:輓近代数学の展望(飯高 茂) 26-288
浅野啓三:環論及イデアル論(中山 正) 02-375
浅野啓三・永尾 汎:群論(飯塚健三)· 17-178
東屋五郎:単純環の代数的理論(浅野啓三) 04-053
足立正久:微分位相幾何学(小宮克弘)· 29-177
石井吾郎:実験計画法/配置の理論 (景山三平) 26-276
石原 繁:幾何学概論(田代嘉宏)······· 29-184
泉 信一:一般級数論(河田竜夫)······· 01-351
伊藤 昇:有限群論(永尾 汎)·········· 26-377
伊藤清三:ルベーグ積分入門(一松 信) 15-251
伊藤清三:偏微分方程式(村松寿延)···· 26-084
稲垣 武:点集合論(長田潤一)·········· 03-120
稲葉栄次:代数函数の代数的理論(玉河恒夫) 02-377
井上正雄:ポテンシャル論(小松勇作)· 05-189
井上正雄:応用函数論(遠木幸成)······· 10-053
今吉洋一・谷口雅彦:タイヒミュラー空間論 (志賀啓成) 42-282
彌永昌吉:幾何学序説(岩村 聯)······· 25-094
彌永昌吉:数論(河田敬義)················ 22-237
彌永昌吉・小平邦彦:現代数学概説Ⅰ (杉浦光夫) 20-185
彌永昌吉・平野鉄太郎:射影幾何学 (岩堀長慶) 11-253
岩澤健吉:代数函数論(稲葉栄次)······· 04-116
岩波講座‘基礎数学’(小谷眞一)······· 35-278
彌永昌吉・彌永健一:集合と位相(森 毅) 35-278
小平邦彦:解析入門Ⅰ~Ⅳ(笠原皓司) 35-279
藤田 宏:解析入門Ⅴ(笠原皓司)···· 35-279
吉田耕作:測度と積分(山崎泰郎)···· 35-280
小平邦彦:複素解析(藤家龍雄)······· 35-280
伊藤 清:確率論(宮本宗実)·········· 35-281
齋藤利彌:常微分方程式Ⅰ(宮武貞夫) 35-282
木村俊房:常微分方程式Ⅱ(宮武貞夫) 35-282
大島利雄・小松彦三郎:1階偏微分方程式 (伊達悦朗) 35-284
藤田 宏・犬井鉄郎・池部晃生・高見穎郎: 数理物理に現われる偏微分方程式 (浅野 潔)·············································· 35-284
増田久弥:非線型楕円型方程式(島倉紀夫) 35-285
岩堀長慶:ベクトル解析(田代嘉宏)···· 15-249
岩村 聯:束論(彌永昌吉)················ 01-349
上野健爾:代数幾何入門(清水勇二)···· 48-209
上野健爾・志賀浩二・砂田利一編集:
数学のたのしみ(真島秀行) 通2巻4号-099
上田哲生・谷口雅彦・諸澤俊介:複素力学系序説 —–フラクタルと複素解析—–(木坂正史) 50-332
宇野利雄:計算機のための数値計算
(高田 勝) 16-184
宇野利雄編:数理統計学演習(丸山儀四郎) 09-059
浦川 肇:変分法と調和写像(大仁田義裕) 45-184
江沢洋,新井朝雄:
場の最子論と統計力学(伊東恵一) 41-276
大島 勝:群論(永尾 汎)················ 07-055
大森英樹:力学的な微分幾何(高橋恒郎) 34-279
岡潔先生遺稿集1~7(木村郁雄)········ 36-377
岡田良知:級数概論(河田竜夫)·········· 04-192
岡村 博:微分方程式序説(福原満洲雄) 03-192
岡本清郷:等質空間上の解析学(峰村勝弘) 41-185
小澤 満:近代函数論Ⅰ(戸田暢茂)···· 29-181
小田忠雄:凸体と代数幾何学(浪川幸彦) 39-183
落合卓四郎・野口潤次郎:幾何学的関数論 (藤本坦孝) 37-376
柏原正樹・河合隆裕・木村達雄:代数解析学の 基礎(片岡清臣,大阿久俊則) 36-282
加藤敏夫:函数空間論(伊藤清三)······· 10-192
加藤平左エ門:和算ノ研究(細井 淙)· 07-054
加藤平左エ門:和算の研究, 雑論Ⅱ (細井 淙) 09-258
加藤平左衛門:和算の研究,補遺1 (一松 信) 21-072
加藤平左衛門:江戸末期の大数学者,和田寧の業績 (一松 信) 21-072
加藤平左衛門:安島直円の業績(一松 信) 24-252
金子 晃:超函数入門 (上),(下) (片岡清臣,大阿久俊則) 36-282
亀谷俊司:初等解析学Ⅰ(田村二郎)···· 05-191
刈屋武昭:回帰分析の理論(藤越康祝)· 33-374
川久保勝夫:変換群論(神島芳宣)······· 40-092
河田龍夫:フーリエ解析と確率論(伊藤 清) 01-143
河田敬義:確率論(伊藤 清)············· 02-271
河田敬義:積分論(亀谷俊司)············· 03-063
河田敬義:微分式論(吉田耕作)·········· 04-053
河田敬義・三村征雄:現代数学概説Ⅱ
(編集部) 17-123
河田敬義・竹内外史:位相幾何学(中岡 稔) 05-120
河内明夫編:結び目理論(村杉邦男)···· 44-091
北川敏男・三留三千男:実験計画要因配置表 (森口繁一) 06-182
草場公邦:行列特論(谷崎俊之)·········· 36-087
楠 幸男:函数論(黒田 正)············· 28-185
国沢清典:近代確率論(伊藤 清)······· 05-121
国田 寛:確率過程の推定(西尾真喜子) 32-189
功力金二郎:解析要論(亀谷俊司)······· 05-054
熊ノ郷準:擬微分作用素(井川 満)···· 35-274
黒田成勝・久保田富雄:整数論(稲葉栄次) 15-246
河野伊三郎:位相空間論(森田紀一)···· 07-056
小島定吉:多角形の現代幾何学(和田昌昭) 48-093
小林孝次郎・高橋正子:オートマトンの理論 (小野寛晰) 37-375
小林昭七:曲線と曲面の微分幾何(森本明彦) 36-083
小林昭七:曲線と曲面の微分幾何(改訂版) (山田光太郎) 50-214
小林昭七:接続の微分幾何とゲージ理論 (中島 啓) 42-183
小松・中岡・菅原:位相幾何学Ⅰ(鈴木治夫) 24-343
小松醇郎:位相空間論(稲垣 武)······· 01-230
小松勇作:一般函数論(井上正雄)······· 06-183
近藤次郎:積分方程式(金沢 隆)······· 07-183
近藤基吉:実函数論(村田 全)·········· 22-077
近藤基吉:実函数論演習(村田 全)···· 22-078
近藤洋逸:ゲーデル‘数学基礎論’
(伊藤 清) 01-047
近藤洋逸:幾何学思想史(近藤基吉)···· 01-142
齋藤利彌:位相力学(浦 太郎)·········· 26-180
佐々木重夫:共形接続幾何学(本部 均) 02-084
佐々木重夫:微分幾何学―大域的考察を 中心として―(一松 信) 13-121
佐武一郎:行列と行列式(森 毅)······· 15-248
佐藤健一:加法過程(神田 護)·········· 46-075
志賀浩二:現代数学への招待(大森英樹) 34-091
渋谷泰隆:複素領域における線型常微分方程式 (高野恭一) 33-085
島内剛一:数学の基礎(岩村 聯)······· 28-381
清水良一:中心極限定理(竹内 啓)···· 30-090
正田建次郎:代数学通論(中山 正)···· 01-229
正田建次郎・浅野啓三:代数学Ⅰ(秋月康夫) 05-254
白岩謙一:力学系の理論(池上宜弘)···· 28-179
神保道夫:量子群とヤン・バクスター方程式 (中神祥臣) 46-362
吹田信之:近代函数論Ⅱ(酒井 良)···· 30-287
末綱恕一:数理と論理(黒田成勝)······· 01-144
末綱恕一:数学の基礎(黒田成勝)······· 04-255
杉原正顯・室田一雄:数値計算法の数理 (篠原能材) 48-211
鈴木通夫:群論(上),(下)(伊藤 昇)··· 37-185
赤 摂也・藤川洋一郎:電子計算機入門 (野崎昭弘) 19-185
竹内外史:数学基礎論(前原昭二)······· 09-195
竹内外史:数理論理学(広瀬 健)······· 27-282
竹内外史:層・圏・トポス(林 晋)···· 31-273
竹内外史:直観主義的集合論(倉田令二朗) 36-184
竹内外史:証明と計算量(菊池 誠)···· 50-327
竹内 啓:統計的推定の漸近理論 (阪市大数理統計ゼミナール) 28-281
竹内 勝:現代の球関数(砂田利一)···· 38-189
竹崎正道:作用素環の構造(御園生善尚) 36-378
田崎 中:江戸時代の数学(杉浦光夫)· 39-373
田島一郎:数学解析入門(亀谷俊司)···· 01-048
立花俊一:リーマン幾何学;リーマン幾何学演習 (石原 繁) 21-233
辰馬伸彦:位相群の双対定理(櫻本篤司) 48-100
田中俊一・伊達悦朗:KdV方程式(神保道夫) 36-088
谷口雅彦・松崎克彦:双曲的多様体とクライン群 (小島定吉) 48-095
谷崎俊之・堀田良之:
加群と代数群 (竹内 潔) 50-095
田村一郎:トポロジー(松本幸夫)······· 26-279
田村一郎:葉層のトポロジー(今西英器) 29-190
田村二郎:解析函数(伊藤清三)·········· 15-250
田村孝行:半群論(井関清志)············· 26-186
淡中忠郎:位相群論(後藤守邦)·········· 02-378
丹野修吉:多様体の微分幾何学(畠山洋二) 30-167
都筑俊郎:有限群と有限幾何(木村 浩) 36-179
寺阪英孝:射影幾何学の基礎(彌永昌吉) 01-350
土井公二・三宅敏恒: 保型形式と整数論(浅井哲也) 31-181
遠山 啓:無限と連続(矢野健太郎)···· 05-056
遠山 啓:行列論(稲葉栄次)············· 06-054
戸川隼人:共役勾配法(藤井 宏)······· 30-170
戸田盛和:非線形格子力学(上野喜三雄) 36-280
戸田盛和:非線形波動とソリトン
(上野喜三雄) 36-280
十時東生:エルゴード理論入門(村田 博) 26-178
中井三留:リーマン面の理論(楠 幸男) 34-089
永尾 汎:群とデザイン(岩崎史郎)···· 28-287
永尾 汎・津島行男: 有限群の表現(渡辺アツミ) 40-279
中岡 稔:双曲幾何学入門(川﨑徹郎)· 48-078
中川久雄:大域のRiemann幾何学
(塩浜勝博) 33-088
永田雅宜:可換体論(西三重雄)·········· 21-070
永田雅宜・宮西正宜・丸山正樹: 抽象代数幾何学(松村英之) 26-275
中西シヅ:積分論(久保田陽人)·········· 27-383
中野茂男:多変数函数論(鈴木 理)···· 36-085
中野秀五郎:ヒルベルト空間論(三村征雄) 01-047
長野 正:曲面の数学(小林昭七)······· 21-232
中山 正・東屋五郎:代数学Ⅱ(池田正験) 06-248
南雲道夫:微分方程式Ⅰ(渋谷泰隆)···· 08-250
鍋谷清治:数理統計学(工藤弘吉)······· 31-275
成田正雄:初等代数学(浅野啓三)······· 21-065
成田正雄:イデアル論入門(中井喜和)· 23-159
成田正雄:代数学(石川武志)············· 29-185
難波完爾:集合論(高橋元男)············· 29-086
二階堂副包:経済のための線型数学 (古屋 茂) 15-180
二階堂副包:現代経済学の数学的方法 (古屋 茂) 15-180
西尾真喜子:確率論(河田龍夫)·········· 32-278
日本科学史学会編:日本科学技術史大系 (一松 信) 23-079
野木達夫・矢島信男:発展方程式の数値解法 (山口昌哉) 30-171
野口 広・福田拓生:初等カタストロフィー (宇敷重広) 29-173
野崎安雄:ポテンシャル論(亀谷俊司)· 02-272
能代 清:近代函数論(大津賀 信)···· 08-126
日合文雄・柳研二郎:ヒルベルト空間と線型作用素 (安藤 毅) 50-328
樋口禎一・吉永悦男・渡辺公夫:
多変数複素解析入門(卜部東介) 35-276
一松 信:多変数函数論(岩橋亮輔)···· 09-197
一松 信:多変数解析函数論(浅見健夫) 13-190
一松 信:解析学序説(田村二郎)······· 15-247
一松 信:数値計算(高田 勝)·········· 16-184
一松 信:近似式(渋谷政昭)············· 17-062
一松信監訳:数論における未解決問題集 (藤原正彦) 36-183
日野幹雄:スペクトル解析(伊理正夫)· 31-276
平山 諦:和算の誕生(上野健爾) 通1巻2号-062
華 羅 庚:数論導引(江田義計)······· 16-177
福島正俊:ディリクレ形式とマルコフ過程 (西岡国雄) 31-282
福原満洲雄:常微分方程式(南雲道夫)· 06-184
藤井光昭:時系列解析(赤平昌文)······· 32-283
藤野精一編:計算数学ハンドブック (大芝 猛) 32-280
伏見康治:力学(山内恭彦)················ 07-182
堀川穎二:複素代数幾何学入門(今野一宏) 43-282
前田文友:連続幾何学(岩村 聯)······· 05-055
前原昭二:数理論理学序説(小野勝次)· 19-055
前原昭二:数理論理学(花沢正純)······· 29-376
増山元三郎:少数例のまとめ方, 1, 2 (渋谷政昭) 17-062
松島与三:リー環論(杉浦光夫)·········· 11-250
松島与三:多様体入門(大森英樹)······· 17-250
松田道彦:外微分形式の理論(垣江邦夫) 29-175
松村英之:集合論入門(大熊 正)······· 20-117
水本久夫:多様体上の差分法(早原四朗) 26-378
溝畑 茂:偏微分方程式論(田辺広城)· 18-253
溝畑 茂:ルべーグ積分(矢野茂樹)···· 20-058
三村征雄:Hilbert空間論(亀谷俊司)· 02-085
宮沢光一:近代数理統計学通論(森口繁一) 07-126
村杉邦男:結び目理論とその応用(本間龍雄) 47-309
閔 嗣 鶴:数論的方法(江田義計)···· 16-179
茂木 勇・伊藤光弘:微分幾何学とゲージ理論 (大森英樹) 39-374
森本清吾:数論(森 繁雄)················ 06-126
山内二郎・森口繁一・一松 信編:電子計算機の ための数値計算法Ⅰ(宇野利雄) 17-185
山内二郎編:統計数値表,新版(一松 信) 26-274
山内恭彦:廻転群及びその表現論(小谷正雄) 01-231
山内恭彦:物理数学(吉田耕作)·········· 03-251
山内恭彦:物理数学(吉田耕作)·········· 15-189
山内恭彦・杉浦光夫:連続群論入門 (一松 信) 12-251
山口昌哉:非線型現象の数学(増田久弥) 26-287
山口昌哉・野木達夫:ステファン問題 (四ツ谷晶二) 36-086
山崎泰郎:無限次元空間の測度(上巻) (下村宏彰) 32-091
山崎泰郎:無限次元空間の測度(下巻) (下村宏彰) 32-281
山本 拓:経済の時系列分析(岡部靖憲) 41-186
吉江琢児:初等第一階偏微分方程式論 (中野秀五郎) 01-145
吉田耕作:エルゴード諸定理(河田敬義) 01-350
吉田耕作:物理数学概論(加藤敏夫)···· 03-062
吉田耕作:積分方程式論(山内恭彦)···· 03-250
吉田耕作:位相解析Ⅰ(伊藤 清)······· 04-191
吉田耕作:ヒルベルト空間論(三村征雄) 06-055
吉田耕作:微分方程式の解法(南雲道夫) 06-125
吉田耕作:超函数論(一松 信)·········· 09-130
吉田洋一:ルベグ積分入門(亀谷俊司)· 18-184
吉田洋一・赤 摂也:数学序説(岩村 聯) 06-249
和田淳蔵:ノルム環(荷見守助)·········· 22-316
和達三樹:非線形波動(武部尚志)······· 46-080
渡辺信三:確率微分方程式(中尾慎太郎) 29-182
アイゼルマン・ブラヴェルマン・ロゾノエル: パターン認識と学習制御(堀部安一) 32-372
B. H. Arnold(赤 摂也訳):トポロジー入門 (水野克彦) 17-058
ウイークス(三村 護・入江晴栄訳): 曲面と
次元多様体を見る-空間の形- (作間 誠)······································ 通2巻2号-087
エビングハウス他(成木勇夫訳):数(上・下) (H. D. Ebbinghaus:Numbers) (中島匠一)················································· 46-077
S. G. ギンディキン(三浦伸夫訳):ガウスが 切り開いた道(吉田朋好) 通1巻3号-055
D. E. Knuth著, 島内剛一監訳:The Art of Computer
Programming Vol. 1, 2 (木田祐司)················································· 44-282
D. B. ザギヤー(片山孝次訳):数論入門 (荒川恒男) 46-083
L. Schwartz(吉田耕作, 渡辺二郎訳): 物理数学の方法(藤原大輔) 20-187
I. M. シンガー,J. A. ソープ: トポロジーと幾何学入門(鈴木治夫) 30-087
スミルノフ:高等数学教程, 1~12 (一松 信) 17-188
ニッカーソン・スペンサー・スティーンロッド (原田重春・佐藤正次訳):
現代ベクトル解析(森 毅)················································· 17-183
E.
J. ハナン:時系列解析(藤井光昭)· 28-177
A・ハラナイ:微分方程式(加藤順二)·· 20-188
J. フォン ノイマン:自己増殖オートマトンの 理論(小林孝次郎) 29-087
ブルバキ:数学史(近藤基吉)············· 27-191
ボゴリューボフ・ミトロポリスキー:非線型振動論 (占部 実) 16-123
ボホナー:科学史における数学史 (中村幸四郎) 24-247
ミラー:Lie群と特殊関数(青本和彦)· 28-380
O. A. ラジゼンスカヤ: 非圧縮粘性流の数学的理論(儀我美一) 38-285
E. L. レーマン:ノンパラメトリックス;順位にもとづく統計的方法(白旗慎吾) 32-188
外国語
Robert D. M. Accola:Topics in the Theory of
Riemann Surfaces (木村秀幸) 49-431
J. F. Adams:Lectures on Lie groups (荒木捷朗) 23-071
Colin C. Adams:The Knot Book, An Elementary Introduction
to the Mathematical Theory of Knots (金信泰造)··································· 49-326
L.
V. Ahlfors:Complex analysis (亀谷俊司) 06-122
L.
V. Ahlfors:Complex analysis (亀谷俊司) 21-231
Lars. Ahlfors:Lectures on quasiconformal
mappings (及川広太郎) 19-187
A. C. Aitken:The case against decimalisation (編集部) 15-191
M. Akahira, K. Takeuchi:Asymptotic efficiency of statistical
estimators. Concepts and higher order asymptotic
efficiency (稲垣宣生)···················· 35-093
Masafumi Akahira:The Structure of Asymptotic Deficiency of
Estimators (江口真透)················································· 42-186
M. Akahira, K. Takeuchi:Non–Regular Statistical
Estimation (久保木久孝) 50-102
G. Alexits:Convergence problems of orthogonal series (一松 信) 14-253
S. Amari:Differential–geometrical
methods in statistics (江口真透) 39-181
American Mathematical Society編: Experimental arithmetic high
computing and mathematics (一松 信)················································· 20-062
F. W. Anderson,K. R. Fuller:Rings and categories modules (政池寛三) 29-179
V. I. Arnold:Mathematical methods of classical mechanics (青本和彦) 30-172
V. I. Arnold:Geometrical methods in the theory of
ordinary differential equations
(宇敷重広)················································· 37-287
V. I. Arnol'd:Ordinary Differential
Equations (伊藤秀一) 46-082
E. Artin:Geometric algebra
(彌永昌吉・玉河恒夫) 11-124
M. Aschbacher:Finite group theory (五味健作) 40-273
K. B. Athreya & P. E. Ney:
Branching processes (田中健一) 27-184
M. Atiyah:
–Theory (吉村善一)······· 21-306
L. Auslander:Differential geometry
(茂木 勇) 21-154
Y. Bar–Hillel (editor):Mathematical logic and
foundations of set theory (福山 克) 24-250
W. Barth, C. Peters, A. Van de Ven: Complex analytic surfaces (宮岡洋一) 37-285
T. Bartoszyński, H. Judah:Set Theory, On The structure of the real
line (加茂静夫)················································· 50-320
J. Barwise:Admissible sets and
structures (篠田寿一) 31-183
J. Barwise, S. Feferman (Ed.):Model–theoretic logics (坪井明人) 40-089
N. K. Bary:A treatise of trigonometric
series, 1, 2 (矢野茂樹) 18-186
H. Bass:Algebraic K–theory (大林忠夫) 23-072
D. Bättig, H. Knörrer:Singularitäten (卜部東介) 47-419
Alan F. Beardon:Iteration of Rational Functions (宇敷重広) 45-283
E. F. Beckenbach編:Applied combinatorial
mathematics (一松 信) 17-252
E. F. Beckenbach-R. Bellman: Inequalities (一松 信) 14-251
J. L. Bell & A. B. Slomson:Models and ultraproducts:
An introduction (上江洲忠弘) 23-236
R. Bellman:Stability theory of
differential equations (南雲道夫) 08-182
R. Bellman-K. L. Cooke:Differential–difference
equations (杉山昌平) 15-241
R. Benedetti & J. J. Risler:Real algebraic and semi–algebraic
sets (塩田昌弘) 43-281
A. Bensoussan, J. L. Lions and
G.Papanicolaou:Asymptotic analysis for periodic structures (渡辺二郎)················································· 33-093
C. Berge:Topological spaces (洲之内治男) 17-056
J. O. Berger:Statistical decision
theory (篠崎信雄) 34-185
S. Bergman:The kernel function and conformal mapping (一松 信) 04-107
P. Bernays-A. A. Fraenkel:
Axiomatic set theory (近藤基吉) 12-128
A. L. Besse:Manifolds all of whose
geodesics are closed (中川久雄) 01-378
L. Besse:Einstein manifolds (二木昭人) 40-187
P. Billingsley:Ergodic theory and
information (久保 泉) 24-249
G. Birkhoff:Lattice theory,revised edition (岩村 聯) 02-373
G. Birkhoff-S. MacLane:A survey of modern algebra (稲葉栄次) 06-181
B. L. Bishop-R. J. Crittenden:Geometry of manifolds (塚本陽太郎) 18-058
E. Bishop:Foundations of constructive analysis (近藤基吉) 28-275
B. Blackadar:
–Theory for Operator Algebras (中神祥臣) 41-279
R. M. Blumenthal-R. K. Getoor:Markov processes and
potential theory (神田 護)················································· 22-236
R. P. Boas, Jr.:Entire functions (石川 修) 11-119
R. P. Boas and R. C. Buck:Polynomial expansions of
analytic functions (樽本浩一)················································· 17-058
Salomon Bochner:The role of mathematics in the rise of science
(竹内 啓) 20-248
S. Bochner-K. Chandrasckharan:Fourier transforms (河田竜夫) 08-246
S. Bochner-W. T. Martin:Several complex variables (一松 信) 02-269
F. F. Bonsall,J. Duncan:Complete normed algebras (和田淳蔵) 28-277
A. Borel:Introduction aux groupes arithmetiques (田坂隆士) 23-314
A. Borel:Linear algebraic groups
(阿部英一) 24-348
A. Borel et al.:Seminar on algebraic groups and related finite groups (岩堀長慶) 24-338
A. Borovik, A. Nesin:Groups of Finite Morley Rank
(田中克己) 48-097
S. Bosch, W. Lütkebohmert, M. Raynaud: Néron Models (斎藤政彦) 48-071
N. Bourbaki:Théorie des ensembles, Chap. Ⅰ, Ⅱ (赤 摂也) 07-050
N. Bourbaki:Algèbre. Chap. Ⅵ,Ⅶ (岩堀長慶) 07-178
N. Bourbaki:Topologie générale (森 毅) 13-176
N. Bourbaki:Groupes et algèbres de Lie, Chapitre Algèbre de Lie (岩堀長慶) 13-180
N. Bourbaki:Variétés différentielles et
analytiques, Ⅰ (一松 信) 21-316
N. Bourbaki:Variétés différentielles et
analytiques,Ⅱ (一松 信) 26-086
O. Bratteli, D. W. Robinson:Operator algebras and quantum
statistical mechanics Ⅰ (岸本晶孝)················································· 33-285
David M. Bressoud:Factrization and Primality Testing (和田秀男) 45-181
H. Breuer:Dictionary for computer
languages
(一松 信) 20-115
H. Brézis:Opérateurs maximaux
monotones et semigroupes de
contractions dans les espaces de Hilbert (小西芳雄)················································· 26-278
D. S. Bridges:Constructive functional
analysis (近藤基吾) 32-374
F. E. Browder編:Mathematical developments
arising from Hilbert problems
(一松 信)················································· 32-373
I. Bucur and A. Deleanu:Introduction to the theory of
categories and functors (服部 昭)················································· 22-231
A. Buium:Differential Algebraic Groups
of Finite Dimension (梅村 浩) 46-085
R. B. Burckel:Characterizations of 
among its subalgebras (荷見守助) 26-285
G. Burde, H. Zieschang:Knots (村上 斉) 39-378
M. Burrow:Representation theory of
finite groups (大島 勝) 19-056
H. Busemann編:Advances in mathematics,1 (一松 信) 18-127
P. Buser:Geometry and Specrta of
Compact Riemann Surfaces (中西敏浩) 50-317
P. Caraman:Homeomorfism cvasiconfome 
–dimensionale (一松 信) 23-065
C. Carathéodory:Funktionentheorie
(亀谷俊司) 03-244
C. Carathéodory:Calculus of variations and
partial differential equations of the first order (小松勇作)················································· 21-153
L. Carleson, T. W. Gamelin:COMPLEX DYNAMICS (木坂正史) 50-432
R. W. Carroll:Abstract methods in partial
differential equations (田辺広城) 25-189
H. Cartan:Théorie élémentaire des
fonctions analytiques d'une ou plusieurs variables complexes (一松 信)················································· 14-063
Séminaire H. Cartan 1960/61:Familles d'espaces complexes
et fondements de la géométrie analytique (岩橋亮輔)················································· 16-251
H. Cartan-S. Eilenberg:Homological algebra (D. Zelinsky) 08-185
M. L. Cartwright:Integral functions
(石川 修) 11-119
T. E. Cecil:Lie Sphere Geometry (宮岡礼子) 46-087
N. N. Čencov:Statistical decision rules
and optimal inference (甘利俊一) 36-187
K. Chandrasekharan:Introduction to analytic
number theory (竜沢周雄) 22-233
F. Chatelin:Spectral approximation of
linear operators (石原和夫) 38-085
A. W. Chatters & C. R. Hajarnavis: Rings
with chain conditions (岩永恭雄) 34-283
Isaac Chavel:Riemannian Geometry: A
Modern Introduction (武藤秀夫) 49-437
G. Chavent, J. Jaffre:Mathematical models and finite elements for reservoir simulation (友枝謙二)················································· 40-282
J. Cheeger,D. G. Ebin:Comparison theorems in Riemannian geometry (中川久雄) 29-180
B.–Y. Chen:Geometry of
submanifolds (劔持勝衛) 28-283
S. S. Chern:Complex manifolds without potential theory (一松 信) 21-300
C. Chevalley:Theory of Lie groups I (後藤守邦) 02-079
C. Chevalley:Théorie des groupe de Lie
II (岩堀長慶) 05-115
C. Chevalley:Algebraic theory of
spinors
(玉河恒夫) 06-048
C. Chevalley:Introduction to the theory
of algebraic functions of one variable (中山 正)················································· 06-050
C. Chevalley:The construction and study
of certain important algebras (岩堀長慶) 09-255
Séminair Chevalley:Classification des groupes
de Lie algébriques (阿部英一) 15-238
W. G. Chinn and N. E. Steenrod:First concepts of topology (一松 信) 20-062
G. Choquet:Topology (竹之内 脩)···· 21-305
K. L. Chung:Markov chains with
stationary transition probabilities (渡辺寿夫) 14-052
R. F. Churchhouse-J. C. Herz編:Computers in mathematical
research (一松 信) 21-301
P. G. Ciarlet:The finite element method
for elliptic problems (菊地文雄) 35-186
P. G. Ciarlet and J. L. Lions:editors: Handbook of Numerical Analysis, Vol. Ⅱ Finite Element Methods
(Part 1) (土屋卓也)··································· 46-073
P. G. Ciarlet:Introduction to Numerical
Linear Algebra and Optimisation (三井斌友) 48-076
A. H. Clifford-G. B. Preston:The algebraic theory of semigroups (田村孝行) 15-181
A. H. Clifford,G. B. Preston:The algebraic theory of semigroups (田村孝行) 21-314
P. J. Cohen:Sets theory and the
continuum hypeothesis (難波完爾) 21-150
L. Collatz:Differentialgleichungen für Ingenieure (古屋 茂) 14-125
L. Collatz:Funktionalanalysis und
numerische Mathematik (藤田 宏) 17-117
L. Collatz & W. Wetterling:Optimierungsaufgaben (杉山昌平) 21-235
P. Conner and E. Floyd:Differentiable periodic maps (内田伏一) 24-339
A. Connes:Noncommutative Geometry (河東泰之) 49-217
C. Constantinescu-A. Cornea:Ideale Ränder Riemannscher
Flächen (中井三留) 16-245
Constantinescu-Cornea:Potential theory of harmonic
spaces (池上輝男) 29-084
J. H. Conway:On numbers and games (山崎洋平) 31-377
J. H. Conway, R. T. Curtis, S. T. Norton,
R. A. Parker, R. A. Wilson:Atlas of finite groups (吉田知行)················································· 39-185
L. Corwin, F. P. Greenleaf:Representations of nilpotent
Lie groups and their applications, Part Ⅰ (井上順子)················································· 49-107
R. Courant:Dirichlet's principle,
conformal mapping, and minimal surfaces
(小松勇作)················································· 04-109
H. Cramér:Mathematical methods of
statistics (河田敬義) 03-060
H. Cramér-M. R. Leadbetter:Stationary and related
stochastic processes (飛田武幸) 20-250
Richard H. Crowell-Ralph H. Fox: Introduction to knot theory (野口 広) 17-053
C. W. Curtis-I. Reiner:Representation theory of
finite groups and associative algebras (大島 勝) ················································· 16-172
H. L. Cycon, R. G. Froese, W. Kirsch,
B. Simon:Schrödinger operators―With Applications to Quantum
Mechanics and Global Geometry (中村 周)······· 43-375
I. Daubechies:Ten Lectures on
Wavelets (守本 晃) 47-085
M. Davis:Computability and
unsolvability (田中尚夫) 20-253
M. de Guzmán:Real variable methods and
Fourier analysis (矢野茂樹) 36-186
G. de Rham:Variétés différentiables (一松 信) 07-171
C. Dellacherie et P. A. Meyer:Probabilités et potentiel,
théorie des martingales
(風巻紀彦)················································· 33-378
P. Dembowski:Finite geometries
(一松 信) 21-303
J. Dénes and A. D. Keedwell:Latin squares and their applications (山本幸一) 28-380
U. Dierkes, S. Hildebrandt, A. Küster
and O. Wohlrab:Minimal Surfaces Ⅱ, Boundary Regularity (石村直之)················································· 47-087
J. Dieudonné:Sur les groupes
classiques (服部 昭) 04-112
J. Dieudonné:La géométrie des groupes
classiques (小野 孝) 09-128
J. Dieudonné:Foundation of modern analysis (矢野茂樹) 17-122
V. A. Ditkin-A. P. Prudnikov:Operational calculus in two
variables and its applications (一松 信)················································· 14-254
J. Dixmier:Les algèbres d'opérateurs
dans l'espace Hilbertien (竹之内 脩) 26-372
J. Dixmier:Les 
–algèbres et leurs représentations (竹之内 脩) 26-374
V. Dlab and P. Gabriel: Representation theory (太刀川弘幸他) 34-375
L. Dornhoff:Group representation
theory (光 道隆) 27-278
F. R. Drake:Set theory (高橋元男)···· 29-378
B. A. Dubrovin, A. T. Fomenko, S. P.
Novikov:Modern geometry Ⅰ, Ⅱ (森本明彦) 40-366
N. Dunford-J. T. Schwartz (with the assistance of W. Bade-R. G.
Bartle): Linear operators, PartⅠ (吉田耕作)················································· 12-065
N. Dunford-J. T. Schwartz:
Linear operators, PartⅡ (SIRS) 18-123
P. L. Duren:Theory of 
–spaces (中村吉邑・柳原二郎) 28-184
G. Duvaut, J. L. Lions:Inequalities in mechanics and physics (小西芳雄) 38-378
R. E. Edwards & G. I. Gaudry:Littlewood-Paley and
multiplier theory (宮地晶彦) 31-280
B. Efron:The Jackknife, the Bootstrap
and Other Resampling Plans (田栗正章・汪金芳)················································· 45-090
L. Ehrenpreis:Fourier analysis in several
complex variables (河合隆裕) 24-152
M. Eichler:Quadratische Formen und
orthogonale Gruppen (小野 孝) 09-249
S. Eilenberg-N. Steenrod:Foundations of algebraic
topology (中岡 稔) 05-250
F. El Zein:Introduction à la théorie de
Hodge mixte (臼井三平) 48-202
C. J. Elieser: Concise vector
analysis (編集部) 15-191
R. Engelking:General Topology (Revised
and completed edition) (大田春外) 46-369
G. Faltings:Lectures on the Arithmetic
Riemann-Roch Theorem (小林亮一) 47-088
V. V. Fedorchuk, A. Ch. Chigogidze:Absolute Retracts and
infinite dimensional manifolds (寺田敏司・津田光一)················································· 48-432
R. P. Feinerman and D. J. Newman: Polynomial approximation (鈴木義也) 30-084
W. Feit: Character of finite groups (永尾 汎) 21-156
A. A. Fel'dbaum:Optimum control systems (杉山昌平) 19-121
J. M. G. Fell-R. S. Doran:Representations of 
–Algebras, Locally Compact Groups and Banach 
–Algebraic Bundles, Ⅰ,Ⅱ
(山上 滋)··································· 41-274
W. Feller:An introduction to
probability theory and its applications (丸山儀四郎) 05-053
W. Feller:An introduction to
probability theory and its applications, Ⅰ,Ⅱ (丸山儀四郎) 19-062
J. F. Fenstad,P. G. Hinman編:Generalized recursion theory
(田中尚夫) 28-273
T. S. Ferguson:Mathematical statistics: A decision theoretic
approach (工藤弘吉)················································· 27-285
S. E. Fienberg and D. V. Hinkley編:R. A. Fisher: An
appreciation (竹内 啓) 33-373
Herbert Fleischer:Eulerian Graphs and Related Topics, Part Ⅰ, Vol. 1 & 2 (土屋守正)················································· 44-365
K. W. Folley編:Semigroups (田村孝行) 23-311
A. P. Fordy, J. C. Wood (Eds):Harmonic Maps and Integral
Systems (浦川 肇) 48-204
O. Forster:Lecture on Riemann
surfaces (栗林暲和) 38-091
Forsythe, G. E. -W. R. Wasow:Finite–difference methods
for partial differential equations
(山口昌哉)················································· 20-241
D. S. Freed & K. K. Uhlenbeck:Instantons and four–manifolds (伊藤光弘) 39-370
M. Freidlin:Functional integration and partial differential
equations (成田清正) 40-365
Frekel-Lepowski-Mourman:Vertex operator algebras and
the Monster (原田耕一郎) 43-177
Peter Freyd:Abelian catagories (服部 昭) 17-174
L. Fuchs:Abelian groups (本田欣哉)·· 12-245
L. Fuchs他編:Proceedings of the
colloquium on Abelian groups (本田欣哉) 18-053
H. Fujimoto:Value Distribution Theory of
the Gauss Map of Minimal Surfaces in 
(野口潤次郎)················································· 48-215
T. Fujita:Classification Theories of
Polarized Varieties (杉江 徹) 44-088
M. Fukushima:Dirichlet forms and Markov
processes (長井英生) 36-082
W. Fulton:Intersection theory (宮西正宜) 39-186
W. Fulton:Introduction to Toric
Varieties (石田正典) 48-091
A. Futaki:Kaehler-Einstein Metrics and
Integral Invariants (小磯憲史) 41-283
S. A. Gaal:Linear analysis and
representation theory (和田淳蔵) 27-283
F. D. Gakhov (I. N. Sneddon英訳): Boundary value problems (熊ノ郷 準) 19-188
T. W. Gamelin: Uniform
algebras (和田淳蔵) 26-189
H. h. Garabedian編:
Approximation of functions (一松 信) 18-060
L. Garding:Encounter with
mathematics (吉川 敦) 31-178
S. B. Garnett:Bounded analytic
functions (林 実樹広) 35-089
A. Gelbart編:Some recent advances in the basic sciences (一松 信) 21-301
B. R. Gelbaum-J. M. H. Olmstead:Counterexamples in analysis
(一松 信) 17-061
I. M. Gel'fand-M. I. Graev-N. Ya.
Vilenkin:Generalized functions (編集部) 19-128
I. M. Gel'fand, M. I. Graev, I. I.
Pyatetskii-Shapiro:表現論と保型函数 (折原明夫) 23-065
Ya. L. Geronimus:Polynomials orthogonal on a
circle and interval (一松 信) 14-253
J. K. Ghosh(ed.):Statistical Information and
Likelihood : A Collection of Critical Essays by Dr. D. Basu (草間時武)················································· 42-184
V. Gillemin and S. Sternberg: Deformation theory of pseudogroup
structures (松田道彦)················································· 23-235
A. Ginzburg:Algebraic theory of automata (寺田文行) 23-077
Jean-Yves Girard:Proofs and Types (八杉満利子) 43-181
J. Glimm and A. Jaffe:Quantum physics —–A functional integral
point of view—– (荒木不二洋)················································· 35-091
R. Glowinski, J. L. Lions, R. Trémolères: Analyse numérique des inéquations variationelles, Tome 1,
Tome 2 (牛島照夫)··································· 32-088
B. V. Gnedenko-A. N. Kolmogorov:Limit distributions for sums
of independent random variables (国沢清典)················································· 08-187
C. Godbillon:Feuilletages, Études géométriques (西森敏之) 46-071
R. Godement:Topologie algébrique et théorie des
faisceaux (服部晶夫) 12-253
I. C. Gohberg and M. G. Krein:Theory and applications of
Volterra operators in Hilbert
space (小谷眞一)················································· 30-164
S. I. Goldberg:Curvature and homology (小畠守生) 16-170
S. W. Golomb:Polyo!minoes (一松 信) 20-245
Golubisky-Gullemin:Stable mappings and their
singularities (福田拓生) 30-089
R. L. Goodstein:Fundamental concepts of
mathematics (赤 摂也) 15-128
D. Gorenstien:Finite groups (都筑俊郎) 22-317
M. Goresky, R. Macpherson: Stratified
Morse Theory (藤木 明) 48-073
M. Goto & F. D. Grosshans:Semisimple Lie algebra (江口正晃) 37-183
W. H. Gottschalk-G. A. Hedlund:Topological dynamics (佐伯卓也) 10-054
S. H. Gould:A manual for translators of
mathematical russian (一松 信) 19-191
S. H. Gould-P. E. Obreanu:Romanian– English dictionary and
grammar for the mathematical sciences (一松 信)················································· 20-124
I. S. Gradshteyn-I. M. Ryzhik:
Table of Integrals, Series and Products (一松 信)················································· 18-255
H. Grauert・R. Remmert:Analytishe Stellenalgebren
(木村郁雄)
28-284
P. Griffiths & J. Morgan:Rational homotopy theory and
differential forms (森田茂之) 35-091
G. W. Grimmett:Percolation (樋口保成) 46-079
M. Gromov:Structures métriques pour
les variétés riemanniennes (酒井 隆) 37-088
V. Guillemin, S. Sternberg:Symplectic techniques in
physics (三上健太郎) 37-284
P. C. Gunning:Lectures on Riemann surfaces
(一松 信) 19-118
R. C. Gunning-H. Rossi:Analytic functions of
several complex variables (一松 信) 17-120
R. K. Guy:Unsolved problems in number theory (藤原正彦) 36-183
Rudolf Haag:Local Quantum Physics (Fields,
Particles, Algebras) (荒木不二洋) 45-285
S. J. Haberman:The analysis of frequency data (伊藤孝一) 29-189
H. Halberstam and H. E. Richert: Sieve
methods (本橋洋一) 31-179
M. Hall, Jr.:
The theory of groups (永尾 汎) 14-185
P. Hall-C. C. Heyde:Martingale limit theory and
its applications (吉原健一) 34-379
Peter Hall:The Bootstrap and Edgeworth
Expansion (汪金芳・田栗正章) 44-371
P. R. Halmos:Measure theory (亀谷俊司) 03-245
P. R. Halmos:Introduction to Hilbert
space and the theory of
spectral multiplicity
(伊藤隆司)················································· 07-050
P. R. Halmos:Lectures on ergodic
theory (伊藤清三) 12-254
F. Harary:Graph theory (一松 信)··· 23-069
G. H. Hardy:Divergent series (松山 昇) 09-056
T. E. Harris:Theory of branching
processes (本尾 実) 17-053
W. A. Harris,Jr. and Y. Sibuya編: Proceedings United States-Japan seminar on differential and
functional equations (一松 信)··································· 21-317
Z. Harris:Mathematical structures on
language (野崎昭弘) 24-080
R. Hartshorne:Algebraic geometry
(丸山正樹) 31-184
H. Hasse:Vorlesungen über
Zahlentheorie (末綱恕一) 03-056
H. Hasse:Über die Klassenzahl
abelscher Zahlkörper (黒田成勝) 04-250
H. Hasse:Mathematik als Wissenschaft
Kunst und Macht (末綱恕一) 05-185
M. Hasumi:Hardy classes on infinitely
connected Riemann surfaces (林 実樹広) 37-187
T. Hawkins:Lebesgue's theory of
integration (村田 全) 26-085
W. K. Hayman:Subharmonic Functions, Vol. 2 (相川弘明) 43-283
G. Heckman, H. Schlichtkrull:Harmonic Analysis and
Special Functions on Symmetric Spaces (示野信一)················································· 49-332
G. Hecor, U. Hirsch:Introduction to the geometry of foliations (稲葉尚志) 39-376
M. Heins:Selected topics in the
classical theory of functions of a complex variable
(一松 信)················································· 14-121
M. Heins:Complex function theory (亀谷俊司) 24-342
S. Helgason:Differential geometry and
symmetric spaces (杉浦光夫) 15-252
S. Helgason:Groups and geometric
analysis, integral geometry, invariant differential operators, and spherical
functions (河添 健)··································· 39-375
L. L. Helms:Introductions to potential
theory (二宮信幸) 26-184
D. R. Henney編:Open questions in mathematics (一松 信) 33-090
Peter Henrici:Discrete variable methods in
ordinary differential equations (一松 信)················································· 17-114
Peter Henrici:Error propagation for difference methods (一松 信) 17-114
Peter Henrici:Elements of numerical
analysis (一松 信) 17-114
P. Henrici:Applied and computational complex analysis (一松 信) 30-168
H. Hermes:Einführung in die mathematische Logik (前原昭二) 17-249
M. Hervé:Several complex variables, local theory (一松 信) 16-186
E. Hewitt-K. Stromberg:Real and abstract analysis (伊藤清三) 19-125
T. Hida:Brownian motion (竹中茂夫) 36-285
E. Hille:Functional analysis and semigroups (吉田耕作) 02-372
E. Hille:Analytic function theory Ⅰ, Ⅱ
(一松 信) 14-123
P. J. Hilton:An introduction to homotopy theory (高橋典大) 08-056
P. J. Hilton-S. Wylie:Homology theory, an
introduction to algebraic topology
(中岡 稔)················································· 14-121
F. Hirzebruch:Garben—–und Cohomologie—–theorie
(一松 信) 09-194
F. Hirzebruch:Neue topologische Methoden
in der algebraischen Geometrie (中野茂男) 10-193
G. Hochschild: The structure of Lie groups (須藤真樹) 18-249
G. Hochschild:Introductions to affine algebraic groups (土井幸雄) 26-187
G. P. Hochschild:Basic theory of algebraic
groups and Lie algebras
(阿部英一,土井幸雄,竹内光弘)················································· 35-182
K. Hoffman:Banach spaces of analytic
functions (和田淳蔵) 17-115
K. H. Hofmann,P. S. Mostert:Elements of compact
semigroups (田村孝行) 21-313
R. Honsberger:Mathematical gems,Ⅰ,Ⅱ
(一松 信) 30-166
Lars Hörmander:An introduction to complex
analysis in several variables (梶原壤二) 19-060
L. Hörmander:The analysis of linear
partial differential operators Ⅰ, Ⅱ (北田 均) 38-090
Wu Yi Hsiang:Cohomology theory of topological transformation groups (吉田朋好)················································· 30-372
S. T. Hu:Homotopy theory (島田信夫) 13-184
S. T. Hu:Homology theory (白岩謙一) 20-122
L. K. Hua:Additive
Primzahltheorie (竜沢周雄) 16-179
L. K. Hua:Abschätzungen von Exponentialsummen und ihre Anwendung in den Zahlentheorie (竜沢周雄)················································· 16-179
Hua Loo Keng (華羅庚) & Wang Yuan (王元):Applications of number
theory to numerical analysis (鹿野 健)················································· 35-187
J. F. P. Hudson:Piecewise linear
topology (福田征子) 23-075
M. Hukuhara-T. Kimura-Mme T.
Matuda:Équations
différentielles ordinaires du premier order dans le champ complexe (齋藤利彌)··································· 13-186
J. E. Humphreys:Linear algebraic groups (阿部英一,土井幸雄,竹内光弘) 35-182
W. Hurewicz-H. Wallman:Dimension theory (森田紀一・入江昭二) 02-183
D. Husemoller:Fibre bundles (鈴木治夫) 21-067
D. Husemoller:Fibre bundles,2nd ed. (北田泰彦) 29-176
Roudolph C. Hwa-Vigdor L. Teplitz:Homology Feynman Integrals (荒木不二洋) 20-183
H. Komatsu (ed.):Hyperfunctions and pseudodifferential
equations (三輪哲二) 26-281
I. A. Ibragimov-Y. A. Rozanov:Gaussian random processes (野本久夫) 33-377
S. Iitaka:Algebraic geometry (安藤哲哉) 40-272
N. Ikeda, S. Watanabe:Stochastic differential
equations and diffusion processes (本尾 実)················································· 35-381
M. Iri:Network,flow,transportation and scheduling (一松 信) 23-070
K. Itô:Foundations of stochastic
differential equations in infinite dimensional spaces (渡辺信三)················································· 39-182
K. Itô and H. P. McKean,Jr.:Diffusion processes and their sample paths (渡辺信三)················································· 23-068
N. Jacobson:The theory of rings (浅野啓三) 03-058
N. Jacobson:Structure of rings (都筑俊郎) 09-253
N. Jacobson:PI–algebras (大堀正幸)· 30-286
H. Jacquet,R. P. Langlands:Automorphic forms on 
(川中宣明) 23-316
James P. Jans:Rings and homology
(太刀川弘幸) 17-179
M. Jarnicki, P. Pflug:Invariant Distances and
Metrics in Complex Analysis (東川和夫) 48-436
B. Jawerth & M. Milman:Extrapolation theory with applications (曽布川拓也) 46-366
T. J. Jech:The axiom of choice (塚田信高) 28-285
T. Jech:Set theory (難波完爾)·········· 33-188
T. Jech:Multiple forcing (加茂静夫)·· 40-277
A. Jeffrey and T. Kawahara:Asymptotic methods in
nonlinear wave theory (西本敏彦) 36-374
C. U. Jensen & H. Lenzing:Model Theoretic Algebra (坪井明人) 43-186
K. K. Jensen, K. Thomsen:Elements of 
-Theory (夏目利一) 48-217
P. E. T. Jorgensen:Operators and representation theory (岸本晶孝) 41-278
R. V. Kadison-J. R. Ringrose:Fundamentals of the theory
of operator algebras Vol. I (竹崎正道)················································· 37-180
J.–P. Kahane:Some random series of functions (猪狩 惺) 24-156
J. P. Kahne:Some random series of
functions (佐藤 坦) 40-276
G. Kallianpur:Stochastic filtering
theory (飛田武幸) 34-184
A. Kanamori:The Higher Infinite
(渕野 昌) 48-085
S. Kaneyuki:Homogeneous bounded domains
and Siegel domains (児玉秋雄) 36-370
L. V. Kantorovich-V. I. Krylov:Approximate methods of
higher analysis (井上正雄) 16-176
I. Kaplansky:Infinite abelian groups
(伊藤 昇) 08-124
I. Kaplansky:An introduction to
differential algebra (小野 孝) 10-056
S. Karlin:A first course in stochastic
processes (白尾恒吉) 21-157
T. Kato:Perturbation theory for
linear operators
(増田久弥) 21-148
T. Kato:A short introduction to
perturbation theory for linear operators (望月 清) 36-375
N. Katz, B. Mazur:Arithmetic Moduli of Elliptic curves (百瀬文之) 44-370
Y. Katznelson:An introduction to harmonic
analysis (猪狩 惺) 21-308
T. Kawata:Fourier analysis of
stochastic processes (河野敬雄) 38-092
S. Kechris:Classical Descriptive Set
Theory, With 34 Illustrations (田中尚夫) 50-108
H. J. Keisler:Model theory for infinitary
logic (本橋信義) 26-191
J. L. Kelley:General topology (長田潤一) 08-183
J. G. Kemeny編:New directions in
mathematics (山室定行) 16-171
J. G. Kemeny,J. L. Snell,A. W. Knapp:Denumerable Markov chains (渡辺寿夫)················································· 21-076
G. R. Kempf:Complex Abelian Varieties
and Theta Functions (露峰茂明) 46-373
C. E. Kenig:Harmonic Analysis Techniques
for Second Order Elliptic Boundary Value Problems (金子 誠)················································· 48-105
B. Kerékjártó:Les fondaments de la géométrie
(編集部) 19-056
A. N. Khovanskii (P. Wynn英訳): The application of continued
fractions and their generalizations to problems in approximation theory (一松 信) 20-116
紀 晃子,J. Myhill,R. Vesley編:Intuitionism and proof theory (白井古希男) 24-245
A. A. Kirillov:Elements of the theory of
representations (梶原 毅) 38-283
W. Klingenberg:Eine Vorlesung über
Differentialgeometrie (荻上紘一) 28-379
Klingenberg:Lectures on closed
geodesics
(田中 実) 32-089
Anthony W. Knapp:Representation theory of
semisimple groups —–An overview based on
examples—– (西山 享)················································· 44-183
A. W. Knapp:Lie Groups, Lie Algebras,
and Cohomology (内藤 聡) 44-280
D. E. Knuth:Surreal numbers (有沢 誠) 31-279
S. Kobayashi:Hyperbolic manifold and
holomorphic mappings (樋口禎一) 24-347
S. Kobayashi:Transformation groups in
differential geometry (落合卓四郎) 27-188
S. Kobayashi,K. Nomizu:Foundations of differential
geometry (荻上紘一) 23-308
S. Kobayashi, H. Wu, C. Horst:Complex differential geometry
(満渕俊樹)
38-187
N. Koblitz:
–adic numbers, 
–adic analysis, and zeta–functions (森田康夫) 37-378
P. Koosis:The logarithmic integral Ⅰ・Ⅱ
(中路貴彦) 48-207
C. Kosniowski:Actions of finite abelian
groups (内田伏一) 30-375
J. L. Koszul:Exposés sur les espaces homogénes symétriques (松島与三) 14-124
Hans-Joachim Kowalsky:Topological Spaces (竹之内 脩) 17-182
I. Kra:Automorphic forms and
Kleinian groups (山本博夫) 28-182
S. G. Krein:Linear differential
equations in Banach space (大内 忠) 23-315
H. Kumano–go:Pseudo–differential
operators (井川 満) 35-274
Kunen:Set theory―An introduction to
independence proofs (花沢正純) 37-283
K. Kunen, J. E. Vaughan (eds. ):Handbook of set–theoretic
topology (玉野研一) 40-185
H. Kunita:Stochastic flows and
applications (藤原 司) 40-281
H. P. Künzi-A. Pfluger編:Festband zum 70. Geburtstag
von Rolf Nevanlinna
(一松 信)················································· 20-189
C. Kuratowski:Topologie Ⅱ (近藤基吉) 05-196
K. Kuratowski:Topology, Ⅰ (近藤基吉) 20-123
S. Kuroda編:The collected papers of
Teiji Takagi (竜沢周雄) 27-379
Yu. A. Kutoyants:Parameter estimation for
stochastic processes (稲垣宣生) 43-183
J. P. LaSalle-S. Lefschetz:International symposium on
nonlinear differential equations and nonlinear mechanics (占部 実)······································· 15-240
I. Lakatos編:Problems in the philosophy
of mathematics (村田 全) 21-229
C. Lanczos:Discourse on Fourier
series (一松 信) 18-185
S. Lang:Introduction to algebraic
geometry (森川 寿) 14-191
S. Lang:Introduction to differentiable
manifolds (志賀浩二) 18-187
S. Lang:Algebra (服部 昭)··············· 18-251
S. Lang:Rapport sur la cohomologie
des groupes (服部 昭) 21-299
S. Lang:Cyclotomic fields (工藤愛知) 33-092
D. Laugwitz:Differentialgeometrie (長野 正) 14-125
D. Laugwitz:Differentialgeometrie
(小畠守生) 17-249
M. A. Lavrent'ev:Variational methods for
boundary value problems for systems of elliptic equations (及川広太郎)················································· 16-254
L. Le Cam:Asymptotic Methods in
Statistical Decision Theory (山田作太郎・鈴木 武) 43-184
J. Leech編:Computational problems in
abstract algebra (田村孝行) 23-309
E. L. Lehmann:Theory of Point
Estimation (三田晴義) 41-282
J. Lehner:Discontinuous group and
automorphic functions (根本精司) 18-120
G. M. Leibowitz:Lectures on complex function
algebras (富山 淳) 28-173
C. G. Lekkerkerker:Geometry of numbers (内山三郎) 23-313
P. Lévy:Processus stochastiques et
mouvement Brownien (伊藤 清) 05-114
André Lichnerowicz:Théorie globale des
connexions et des groupes d'holonomie
(尾関英樹)················································· 11-055
Séminaire Sophus Lie (1954/1955):Théorie des algèbres de Lie,
Topologie des groupes de Lie (杉浦光夫)················································· 11-053
D. V. Lindley:Introduction to probability
and statistics (竹内 啓) 17-254
Yu. V. Linnik (S. J. Taylor英訳):Decomposition of probability
distributions (河田竜夫) 21-069
J. L. Lions:Equations différentielles opérationnels
et problèmes aux limites (田辺広城)················································· 15-243
J. L. Lions:Contrôle optimal de systèmes
gouvernés par des équations aux dérivées partielles (�岡邦夫)················································· 22-154
J. L. Lions and E. Magenes:Problèmes aux limites non
homogènes et applications Ⅰ,Ⅱ (藤原大輔)················································· 23-158
J. E. Littlewood:Lecture on the theory of
function (Y. K. ) 02-368
C. L. Liu:Introduction to
combinatorial mathematics (一松 信) 21-304
C. Livingston:Knot Theory, The Carus
Mathematical Monographs Number 24 (中西康剛)················································· 50-219
G. G. Lorentz:Approximation of functions (鈴木義也) 23-157
Jan Lukasiewicz:Elements of mathematical
logic (中村幸四郎) 17-248
Y. L. Luke:The special functions and
their approximations (一松 信) 22-317
A. T. Lundell and S. Weingram:The topology of CW complexes (宮崎 宏) 24-343
G. Lusztig:Introduction to Quantum
Groups (谷崎俊之) 47-199
W. Maak:Fastperiodische
Funktionen (宇沢弘文) 04-252
N. Madras, G. Slade:The Self–Avoiding Walk (服部哲弥) 47-311
W. Magnus-F. Oberhettinger-R. P. Soni:Formulas and theorems for
the special functions of mathematical physics (一松 信)··································· 20-061
B. Malgrange:Ideals of differentiable
functions (岩橋亮輔) 21-153
J. Malitz:Introduction to mathematical
logic (本橋信義) 33-188
B. B. Mandelbrot:Fractals:forms chance,and dimension (一松 信) 30-169
Jerome H. Manheim:The genesis of point set topology
(河野伊三郎) 17-181
H. B. Mann編:Error correcting codes (一松 信) 22-232
K. V. Mardia, J. T. Kent, J. M. Bibby:Multivariate analysis (早川 毅) 34-280
A. W. Marshall-I. Olkin:Inequalities:Theory of majorization and
its applications
(安藤 毅)················································· 33-375
V. P. Maslov:The complex WKB Method for
Nonlinear Equations Ⅰ. Linear Theory (内山康一)················································· 50-100
M. Matsuda:First order algebraic
differential equations (西岡啓二) 37-086
J.–L. Mauclaire:Intégration et théorie des
nombres (釜江哲朗) 40-275
G. Maury et J. Raynaud:Ordres maximaux au sens de
K. Asano (丸林英俊) 34-090
D. McDuff, D. Salamon:
–holomorphic Curves and Quantum Cohomology (高倉 樹) 50-104
M. Métivier, J. Pellaumail:Stochastic integration (塩田安信) 37-188
P.–A. Meyer:Probabilités et potentiel; Probability and potentials (本尾 実) 21-156
Y. Meyer:Ondelettes et Opérateurs Ⅰ, Ⅱ, Ⅲ (内山明人) 45-183
S. G. Mikhlin:Variational methods in
mathematical physics (一松 信) 17-253
S. G. Mikhlin:Multidimentional singular
integrals and integral equations (熊ノ郷準)················································· 19-123
J. Mikusiński:Operational calculus
(吉田耕作) 12-190
J. Milnor:Morse theory (塚本陽太郎) 21-317
J. W. Milnor:Lectures on the 
–cobordism theorem (加藤十吉) 22-234
J. Milnor:Singular points of complex
hypersurfaces (諏訪立雄) 22-314
C. Miranda:Partial differential
equations of elliptic type (下田節郎) 24-253
Barry Mitchell:Theory of categories (遠藤静男) 20-249
C. J. Mode:Multitype branching
processes
(藤曲哲郎) 26-079
J. D. Monk with R. Bonnet (ed.):Handbook of Boolean Algebras
(渕野 昌)
43-179
C. C. Moore, C. Schochet:Global Analysis On Foliated
Spaces (夏目利一) 41-280
M. Mores:Topological methods in the
theory of functions of a complex variable
(松本敏三)················································· 04-115
F. Morgan:Geometric Measure
Theory. A
Beginner's Guide (中内伸光) 46-363
Dietrich Morgenstern:Einführung in die Wahrscheinlichkeitsrechnung und
mathematische Statistik (竹内 啓)················································· 17-126
C. B. Morrey:Multiple integrals in the
calculus of variations (村松寿延) 24-159
Y. N. Moschovakis:Elementary induction on
abstract structures (福山 克) 29-187
Y. N. Moschovakis:Descriptive set theory (安田 豊) 38-087
R. E. Mosher and M. C. Tangora:Cohomology operations and
applications in homotopy theory (島田信夫)················································· 24-154
P. S. Mostert:Proeedings of the conference
on transformation groups (大森英樹) 21-315
A. Mostowski-M. Stark:Introduction to higher
algebra (一松 信) 16-186
D. Mumford:Geometric invariant
theory (山田 浩) 19-185
D. Mumford:Tata lectures on theta
I (小泉正二) 36-369
D. Mumford:Tata lectures on theta
II
(塩田隆比呂) 40-090
S. B. Nadler, Jr.:Continuum Theory (小山 晃) 46-376
Jun–iti Nagata:Modern dimension theory (児玉之宏) 18-121
J. Nagata:Modern dimension theory
(津田光一) 38-188
M. Nagata:Local rings (成田正雄)····· 16-181
B. Sz. Nagy:Spektraldarstellung linearer
transformationen des Hilbertschen Raumes (吉田耕作)················································· 03-247
Y. Nakagami-M. Takesaki:Duality for crossed products
of von Neumann algebras
(押川元重)················································· 36-371
M. Namba:Geometry of projective
algebraic curves (今吉洋一) 39-371
M. Namik Ogustöreli:Time–lag control systems (杉山昌平) 19-119
R. Narasimhan:Introduction to the theory
of analytic spaces (一松 信) 20-190
I. P. Natanson:Theorie der Funktionen einer
reellen Varänderlichen (丸山儀四郎) 07-176
E. Nelson:Tensor anaysis (矢野健太郎) 21-309
V. V. Nemytskii-V. V. Stepanov:Qualitative theory of
differential equations (浦 太郎)················································· 14-057
R. Nevanlinna:Uniformisierung (田村二郎) 06-246
R. Nevanlinna他:Analytic functions
(一松 信) 12-247
M. H. A. Newman:Elements of the topology of
plane sets of points (亀谷俊司) 05-188
J. C. C. Nitsche:Lectures on minimal
surfaces, vol. 1 (小磯深幸) 44-092
K. Nomizu:Lie groups and differential
geometry (岩堀長慶) 11-248
D. G. Northcott:An introduction to homological algebra (都筑俊郎) 14-190
D. G. Northcott:Finite free resolutions (橘 貞雄) 30-092
D. G. Northcott:Affine sets and affine
groups (阿部英一,土井幸雄,竹内光弘) 35-182
K. Noshiro:Cluster sets (黒田 正)·· 13-188
T. Oda:Periods of Hilbert modular
surfaces (太田雅己) 38-088
T. Oda:Lectures on torus embeddings
and applications (土橋宏康) 36-373
T. Oda:Convex Bodies and Algebraic
Geometry (中村 郁) 41-184
J. Ogawa:Statistical theory of the
analysis of experimental designe (石井吾郎) 29-377
K. Oka:Sur les fonctions
analytiques de plusieurs variables (河合良一郎) 15-235
Okonnk-Schneider-Spindler:Vector bundles on complex projective spaces (丸山正樹) 37-090
T. Okubo:Differential geometry
(矢野健太郎) 40-371
F. Oort:Commutative group
schemes
(本田 平・宮西正宜) 20-252
O. Ore:The Four–color problem (一松 信) 20-244
P. Orlik & H. Terao:Arrangements of Hyperplanes
(日比孝之) 46-368
M. Otto編:Mathematiker über die
Mathematik (一松 信) 28-378
PWN編:Recent developments in
general relativity (池田峰夫) 15-189
R. S. Palais:Foundations of Global
nonlinear analysis (大森英樹) 26-087
Carol Parikh:The Unreal Life of Oscar Zariski (松村英之) 44-368
K. R. Parthasarathy:Probability measures on
metric spaces (岡部靖憲) 21-311
G. K. Pedersen:
–algebras and their automorphism groups (高井博司) 33-284
R. Péter:Rekursive Funktionen (赤 摂也) 08-058
V. V. Petrov:Sums of independent random
variables (清水良一) 30-088
A. Pietsch:Nuclear locally convex
spaces (高村多賀子) 28-180
J. D. Pincus編:Summer institute on spectral
theory and statistical mechanics
(一松 信)················································· 19-191
V. A. Pliss:Nonlocal problems of the
theory of oscillations (齋藤利彌) 20-119
C. Pommerenke:Univalent functions (窪田佳尚) 29-178
L. S. Pontryagin-V. G. Boltyanskii-R.
V. Gamkrelidze-E. F. Mishchenko:The mathematical theory of optimal
processes (小林竜一) ·································· 16-125
M. M. Postnikov:Foundations of Galois theory
(河田敬義) 14-254
K. Prachar:Primzahlverteilung (竜沢周雄) 16-179
Proceedings of the United States -
Japan seminar in differential geometry (志賀浩二) 19-118
C. Procesi:Rings with polynomial
identities (大堀正幸) 30-286
P. H. Rabinowitz:Minimax methods in critical
point theory with applications to differential equtions (田中和永)················································· 46-182
H. Rademacher:Topics in analytic number
theory (三井孝美) 28-175
H. Radjavi,P. Rosenthal:Invariant subspaces (北野孝一) 28-278
A. Ralston-H. S. Wilf編:Mathematical methods for
digital computers 2 (一松 信) 20-243
R. M. Range:Holomorphic Functions and
Integral Representations in Several Complex Variables (安達謙三)················································· 48-088
M. M. Rao, Z. D. Ren:Theory of Orlicz Spaces (北 広男) 46-090
H. Rasiowa:An algebraic approach to non–classical
logic (小野寛晰) 29-375
H. E. Rauch and H. M. Farkas:Theta functions with
applications to Riemann surfaces (加藤崇雄)················································· 28-280
M. Reed-B. Simon:Methods of modern
mathematical physics, Ⅰ-Ⅳ
(黒田成俊)················································· 37-181
R.–D. Reiss:Approximate Distributions of
Order
Statistics ― With Applications to Nonparametric
Statistics (松縄 規)··································· 50-216
A. Rényi:Wahrscheinlichkeitsrechnung
mit einem Anhang über Informationstheorie (国沢清典)················································· 15-127
G.
Ringel:Map
color theorem (一松 信) 28-174
J. Riordan:An introduction to
combinatorial analysis (山本幸一) 12-186
B. D. Ripley:Statistical Inference for
Spatial Processes (間瀬 茂) 47-306
J. F. Ritt:Differential algebra (奥川光太郎) 03-117
A. P. Robertson and W. J. Robertson:Topological vector spaces (関数解析研究会) 21-074
T. Robertson, F. T. Wright, R. L.
Dykstra: Order Restricted Statistical Inference
(笹渕祥一)················································· 49-329
B. Rodin and L. Sario:Principal functions (吉田紀雄) 21-237
L. Rodino:Linear Partial Difrerential Operators in Gevrey Spaces (森本芳則) 48-102
H. Rogers,Jr. :Theory of recursive
functions and effective computability (田中尚夫) 22-155
L. C. G. Rogers-D. Williams:Diffusions, Markov Processes, and
Martingales, vol.2: Itô Calculus (山田俊雄)················································· 41-375
C. P. Rourke and B. J. Sanderson:Introduction to piecewise–linear
topology (福原真二) 26-286
G. G. Roussas:Contiguity of probability
measures; Some application in statistics (柳川 堯)················································· 26-280
H. L. Royden:Real analysis (一松 信) 15-251
H. Rubin & J. Rubin:Equivalents of axiom of choice, Ⅱ (難波完爾) 39-285
Walter Rudin:Fourier analysis on
groups (矢野茂樹) 20-059
W. Rudin:Function theory in the unit
ball of 
(梶原壤二) 34-186
D. Ruelle:Thermodynamic formalism (大野泰治郎) 32-376
T. L. Saaty編:Lectures on modern
mathematics Ⅰ, Ⅱ (一松 信) 17-052
T. L. Saaty編:Lectures on modern
mathematics,Ⅲ (一松 信) 21-159
G. E. Sacks:Saturated model theory
(本橋信義) 27-284
S. Sakai:
–algebras and 
–algebras
(御園生善尚) 26-370
S. Saks-A. Zygmund:Analytic functions (小掘 憲) 07-122
G. Samorodnitsky, M. S. Taqqu:Stable non–Gaussian Random
Processes ― Stochastic Models with Infinite
Variance (竹中茂夫)··································· 48-108
P. Samuel:Algèbre locale (永田雅宜)· 07-049
P. Samuel:Méthodes d'algèbre abstraite
en géométrie algébrique (永田雅宜) 09-055
G. Sansone and R. Conti:Non–linear differential
equations (吉沢太郎) 17-186
L. Sario and K. Oikawa:Capacity functions (酒井 良) 26-081
L. Sario-M. Nakai:Classification theory of
Riemann surfaces (藤家龍雄) 26-181
Sarnak:Some Applications of Modular
Forms (小山信也) 50-319
M. Schechter:Principles of functional
analysis (牛島照夫) 26-182
L. I. Schiff:Quantum mechanics (小林 稔) 03-120
M. Schiffer-D. C. Spencer:Functionals of finite
Riemann surfaces (一松 信) 07-172
O. F. G. Schilling:The theory of
valuations (稲葉栄次) 05-119
W. Schmeidler:Lineare Operatoren im
Hilbertschen Raum (三村征雄) 08-055
Th. Schneider:Einführung in die
transzendenten Zahlen (大成節夫) 15-184
H. Scholz und G. Hasenjaeger:Grundzüge der mathematischen Logik (赤 摂也) 15-127
J. A. Schouten:Tensor analysis for
physicists (岩田義一) 05-253
J. A. Schouten:Ricci–Calculus. An
introduction to tensor analysis and its geometrical applications (矢野健太郎)················································· 07-124
H. Schubert:Topologie, eine Einführung (小林貞一) 17-057
K. Schütte:Proof theory (高野道夫)·· 30-371
L. Schwartz:Théorie des
distributions (竹之内 脩・林 一道) 03-113
L. Schwartz:Théorie der distributions Ⅱ
(林 一道) 04-187
J. T. Schwartz編:Mathematical aspects of
computer science (藤野精一) 21-302
Scientific American, 1964年9月号 (赤 摂也) 17-173
W. R. Scott:Group theory (稲垣信夫) 17-177
B. Segre:Prodromi di Geometria
Algebrica (水野弘文) 26-274
J.–P. Serre:Groupes algébriques et corps
de classes (有馬 哲) 12-177
J.–P. Serre:Corps locaux (本田 平)· 18-190
J.–P. Serre:Lie algebras and Lie
groups (菅野恒雄) 19-116
J.–P. Serre:Algèbres de Lie semi–simples
complexes (菅野恒雄) 20-118
J. P. Serre:Abelian 
–adic representation and elliptic curves (森田康夫) 22-239
J.–P. Serre:Represéntations linéares des
groupes
finis (吉田知行) 27-287
I. R. Shafarevich:Basic algebraic
geometry (猪瀬博司) 31-277
C. E. Shannon-J. McCarthy:Automata studies (赤 摂也) 10-049
C. E. Shannon-W. Weaver:The mathematical theory of
communication (国沢清典) 04-189
J. H. Shapiro:Composition Operators and
Classical Function Theory (高木啓行) 50-330
O. Shisha編:Inequalities (一松 信) 21-159
G. R. Shorack, J. A. Wellner:Empirical Processes with Applications
to Statistics
(安芸重雄)················································· 46-364
M. A. Shubin:Pseudo–differential
operators and spectal theory (長瀬道弘) 40-278
C. L. Siegel:Transcendental numbers (黒田成勝) 03-189
C. L. Siegel:Verlesungen über Himmelsmechanik
(青木信仰) 11-057
C. L. Siegel:Zur Reduktionstheorie
quadratischer Formen (編集部) 15-191
C. L. Siegel:Lectures on advanced
analytic number theory (本田 平) 16-174
C. L. Siegel:Symplectic geometry (伊原信一郎) 17-180
W. Sierpiński:Elementary theory of numbers
(鹿野 健) 17-176
Joseph H. Silverman:Advanced Topics in the
Arithmetic of Elliptic Curves (中村哲男) 49-434
I. Singer:Cea mai bună approximare în
spaţii vectoriale normate prin elemente din spaţii vectoriale (一松 信)················································· 21-073
Y.–T. Siu:Lectures on
Hermitian-Einstein metrics for stable bundles and Kähler-Einstein metrics (満渕俊樹)················································· 40-370
L. A. Skornyakov:Complemented modular lattice
and regular rings (雨宮一郎) 18-119
I. N. Sneddon:Mixed boundary value
problems in potential theory (小松勇作) 21-152
C. D. Sogge:Fourier Integrals in
Classical Analysis (杉本 充) 50-098
Edwin H. Spanier:Algebraic topology (野村泰敏) 20-246
T. A. Springer:Linear algebraic groups (阿部英一,土井幸雄,竹内光弘) 35-182
R. P. Stanley:Enumerative Combinatrics,
Volume Ⅰ (日比孝之) 44-089
N. Steenrod:The topology of fibre
bundles (静間良次) 03-248
N. E. Steenrod:Cohomology operations (横田一郎) 15-187
M. L. Stein-W. D. Munro:Computer programming (野崎昭弘) 17-059
E. M. Stein and G. Weiss:Introduction to Fourier analysis on
Euclidean spaces (矢野茂樹)················································· 28-183
E. M. Stein:Harmonic Analysis; Real–Variable
Methods, Orthogonality, and Oscillatory Integrals (宮地晶彦)················································· 47-421
S. Sternberg:Lectures on differential
geometry (荻上紘一) 20-063
M. I. Stoka:Geometrie Integrală (栗田 稔) 21-155
E. L. Stout:The theory of uniform
algebras
(藪田公三) 28-178
H. Strasser:Mathematical Theory of
Statistics (山田作太郎・鈴木 武) 43-184
S. Stratila and L. Zsido:Lectures on von Neumann
algebras (英訳:S. Teleman) (荒木不二洋)················································· 32-378
D. W. Stroock-S. R. S. Varadhan: Multidimensional
diffusion processes (国田 寛)················································· 34-282
M. Sugiura:Unitary representations and
harmonic analysis (平井 武) 36-182
R. G. Swan:Algebraic 
–theory
(大林忠夫) 23-072
M. E. Sweedler:Hopf algebras (服部 昭) 24-078
R. M. Switzer:Algebraic topology–homotopy
and homology (小林貞一) 30-370
M. Takesaki:Tomita's theory of modular Hilbert algebras and its
applications
(竹之内 脩)················································· 26-375
M. Takesaki:Theory of operator algebras Ⅰ (斉藤和之) 33-281
G. Takeuti and W. M. Zaring:Axiomatic set theory (篠田寿一) 26-283
G. Takeuti:Two applications of logic to
mathematics (八杉満利子) 36-283
G. Takeuti:Proof theory, (second
edition) (倉田令二朗) 40-368
K. Takeuchi, H. Yanai, B. N. Mukherjee:The foundations of
multivariate analysis (白倉暉弘)················································· 37-091
A. Tarski:Undecidable theories (赤 摂也) 06-239
M. E. Taylor:Pseudodifferential Operators
and Nonlinear PDE, Progress in Mathematics, vol. 100 (山崎昌男)················································· 50-325
R. Temam:Navier-Stokes equations
(森本浩子) 32-378
S. Thangavelu:Lectures on Hermite and
Laguerre Expansions (勘甚裕一) 50-105
J. A. Thorpe:Elementary topics in
differential geometry (尾関英樹) 33-087
A. F. Timan:Theory of approximation of
functions of a real variable (洲之内源一郎)················································· 17-051
E. C. Titchmarsh:The theory of the Riemann
zeta–function (竜沢周雄) 04-253
E. C. Titchmarsh:Eigenfunction expansions
associated with second–order differential equations, Part Ⅱ (加藤敏夫)················································· 12-188
E. Torgersen:Comparison of Statistical
Experiments (草間時武) 44-363
L. F. Tóth:Regular figures (一松 信) 17-060
F. G. Tricomi:Vorlesungen über
Orthogonalreihen (河田竜夫) 08-125
H. Triebel:Interpolation theory,
function spaces, differential operators (村松寿延) 33-083
H. Triebel:Fourier analysis and
function spaces (村松寿延) 36-180
H. Triebel:Spaces of Besov‐Hardy‐Sobolev type (村松寿延) 36-180
A. S. Troelstra:Lectures on linear
logic
(小野寛晰) 46-371
A. J. Tromba:Teichmüller Theory in
Riemannian Geometry (宇田川誠一) 46-374
C. Truesdell:An essay toward a unified
theory of special functions, based upon the functional equation 
(柴垣和三郎) 05-051
M. Tsuji:Potential theory in modern
function theory (及川広太郎) 14-050
K. Ueno:Classification theory of
algebraic varieties and compact complex spaces (藤木 明)················································· 36-379
M. Urabe:Nonlinear autonomous
oscillations,analytical theory (宇野利雄) 24-341
B. van der Pole-H. Bremmer:Operational calculus based
on the two–sided Laplace integral (伊藤 清)················································· 11-116
B. L. van der Waerden:Science awakening (S. I.) 07-182
Varchenko, V. I. Arnold, Gusein-Zade:Singularities of differentiable
maps, vol. Ⅰ (福田拓生)················································· 38-377
J. von Neumann-O. Morgenstern:Theory of games and economic
behavior (関 恒義)················································· 03-185
A. Wald:Statistical decision
functions (宮沢光一) 04-049
C. T. C. Wall:Surgery on compact
manifold (松元重則) 26-083
A. H. Wallace:An introduction to algebraic
topology (小松醇郎) 15-187
C. Warner:Harmonic analysis on
semi-simple Lie groups, Ⅰ,Ⅱ (岡本清郷) 27-189
Washington:Introduction to cyclotomic
Fields (小松啓一) 41-092
S. Watanabe:Lectures on stochastic
differential equations and Malliavin calculus (重川一郎)················································· 38-375
W. C. Waterhouse:Introduction to affine group
schemes (阿部英一,土井幸雄,竹内光弘) 35-182
A. Weil:Foundations of algebraic
geometry
(小泉正二) 02-082
A. Weil:Sur les courbes algébriques
et les variétés qui s'en déduisent (井草準一) 03-061
A. Weil:Variétés abéliennes et
courbes algébriques (井草準一) 03-061
A. Weil:Theorie der Kählerschen
Mannigfaltigkeiten (秋月康夫) 06-121
André Weil:Introduction à l'étude des
variétés kählériennes (森川 寿) 13-122
Weil:Basic number theory (足立恒雄) 24-345
A. Weil:Number theory (足立恒雄)··· 38-374
André Weil:Souvenirs
d'apprentissage (The
apparenticeship of a Mathematician) (草場公邦)················································· 44-367
H. Weyl:Die Idee der Riemannschen Fläche
(佐々木秀穂・田村二郎・一松 信) 09-125
H. Weyl-F. J. Weyl:Meromorphic functions and
analytic curves (松本敏三) 04-114
G. W. Whitehead:Elements of homotopy theory (笹尾靖也) 32-377
D. T. Whiteside:The mathematical works of Isaac Newton 1 (中村幸四郎) 18-116
G. T. Whyburn:Topological analysis
(一松 信) 11-123
Wielandt:The theory of permutation
groups (永井 治) 18-055
S. Wiggins:Normally Hyperbolic
Invariant Manifolds in Dynamical Systems (國府寛司)················································· 50-434
T. J. Willmore:An introduction to
differential geometry (矢野健太郎) 12-249
A. Wintner:The analytical foundations
of celestial
mechanics (浦 太郎) 03-119
P. Wolf:Algebraische Theorie der
Galoisschen Algebren (増田勝彦) 10-058
N. M. J. Woodhouse:Geometric Quantization (三上健太郎) 47-315
M. Woodroofe:Nonlinear renewal theory in
sequential analysis (高橋 一) 37-084
K. Yano:Groups of transformations in
generalized spaces (佐々木重夫) 02-188
K. Yano:The theory of Lie
derivatives and its applications (高橋恒郎) 09-129
Kentaro Yano:Differential geometry on complex and almost complex
spaces (佐々木重夫)················································· 19-117
K. Yano-S. Bochner:Curvature and Betti numbers (一松 信) 06-052
M. Yoshida (吉田正章):Fuchsian Differential
Equations with Special Emphasis on the Gauss-Schwarz theory (寺田俊明)················································· 42-090
T. Yoshino:Introduction to Operator
Theory (古田孝之) 48-081
T. Yoshizawa:Stability theory by
Liapunov's second method (栗原光信) 24-340
K. Yosida:Functional analysis (山中 健) 21-234
A. C. Zaanen:Integration (伊藤清三) 22-233
O. Zariski:Introduction to the problem
of minimal models in the theory of algebraic surfaces (永田雅宜)················································· 12-127
O. Zariski-P. Samuel:Commutative algebra, Ⅰ, Ⅱ (永田雅宜) 13-182
O. Zariski:Algebraic surfaces (飯高 茂) 26-088
A. Zygmund:Trigonometric series (矢野茂樹) 14-187
Н. Я. Виленкин:Специальные функции и теория представлений групп (杉浦光夫)················································· 19-255
И. М. Гельфанд-М. И. Граев-Н. Я. Виленкин:Интегральная гесметрия и связанные с ней вопросы теорий представлений (辰馬伸彦他) 16-247
И. М. Гельфанд-Г. Е. Шилов:Обобшенные функции (I. M.
Gelfand-G. E. Šilov:超函数論) (山中 健・折原明夫・高村幸男・湯浅多賀子・鈴木一正・松原 稔)······ 12-179
И. М. Гельфанд-Н. Я. Виленкин:Некоторые применения гармонического анализа. Оснашённые
Гильбертвы пространства (折原明夫)······ 14-246
Г. М. Голузин:Геометрическая теория
функций комплексного
переменного (久保忠雄)················································· 06-243
Е. Б. Дынкин:Основания теории Марковских процессов (佐藤健一) 14-055
Е. Б. Дынкин:Марковские процессы (佐藤健一) 19-126
А. Н. Колмогоров-С. В. Фомин:Элементры теории функций и функционал ь ного анализа (函数論と函数解析の基礎) (伊藤清三)··································· 15-124
А. Г. Курош:Лекции по обшей алгебре (服部 昭) 18-057
О. А. Ладьженская-Н. Н. Уральцева: Линейные и квазилинейные уравнения эллиптического типа (草野 尚)················································· 18-061
Р. Ш. Липцер, А. Н. Ширяев:Теория мартингалов (櫃田倍之) 41-277
Е. С. Ляпин:Полугруппы (井関清志) 14-060
Г. И. Марчук:Методы вычислительной математики (野木達夫) 30-085
В. П. Маслзв:Теория возмушени й иасимптотические методы (吉川 敦)················································· 27-186
М. А. Наймарк:Нормированные кольца (M. A.
Neumark:ノルム環) (三村征雄) 11-060
М. А. Наймарк:Линейные представления группы Лоренца (杉浦光夫) 18-189
Л. С. Понтрягин:Обыкновенные дифференциальные уравнения (黒田成俊)················································· 17-121
Б. А. Севастьянов:Ветвяшиеся процессы (河津 清) 27-280
А. В. Скороход:Случайные процессы с независимыми прирашениями (山里 真)················································· 41-091
Б. А. Фукс:Теория аналических функций многих комплексных переменных (一松 信)················································· 08-246
И. Р. Шафаревич他:Алгепраическепо верхности (飯高 茂) 19-057
ソ連百科辞典局編:Математическая энциклопедия,
1 (А-Г)(一松 信) 30-374