$\langle$ $\rangle$ $\langle 4\rangle(5)\langle 6$ ) 1855 ( 2 ) (2) 10 (1877 ) (The Tokyo llathematical Society) 11 ( ) ( ) 117 ( ) ( ), (

Size: px
Start display at page:

Download "$\langle$ 1 177 $\rangle$ $\langle 4\rangle(5)\langle 6$ ) 1855 ( 2 ) (2) 10 (1877 )10 100 (The Tokyo llathematical Society) 11 ( ) ( ) 117 ( ) ( ), ("

Transcription

1 $\mathrm{w}_{b\gamma_{\mapsto\infty}}\cdot\cdot\leftrightarrow \mathfrak{b}\infty-\mathrm{f}\mathrm{f}\mathrm{l}$ffi Facul y of Economics, Momoyama Gakuin Univ. (Hiromi Ando) (1) 1853 ( ) ( ) (1) (2) (3) (4) (5) (6) (7) (8) (9) 33 (4) \rightarrow \rightarrow \rightarrow (5) \rightarrow \rightarrow \rightarrow.(6) \rightarrow \rightarrow \rightarrow \rightarrow \rightarrow (1) \rightarrow ; \rightarrow \rightarrow

2 $\langle$ $\rangle$ $\langle 4\rangle(5)\langle 6$ ) 1855 ( 2 ) (2) 10 (1877 ) (The Tokyo llathematical Society) 11 ( ) ( ) 117 ( ) ( ), ( ), ( ), ( ), ( ), ( ), ( ), ( ), ( ), ( ), ( ), ( ), ( ), ( ), ( ), ( ), ( ), ( ), ( ) ( ) ( ), ( ) ( ), ( ) ( ) ( ) ( ), ( ), ( ), ( ), ( ), ( ), ( ), ( ) (Dr. L. Schendal) :

3 178 ( ) ( ) 25% [ ] [ ] [ p6] 25% 2 $\text{ }$ : $(3\rangle$ ( ) ( ) ( )

4 179 ( ) (, 1991 ) [ 3 2 (1862)3 13 ; ; ; 6 (7) T. Harris$( )$ 1 $\mathrm{g}=$ ( ) $\mathrm{g}=$ 1 $\mathrm{g}$ 5 16g ( ) 1 = ( ) 6 [ ]

5 180 $\mathrm{p}\mathrm{r}\mathrm{u}\mathrm{y}\mathrm{n}\langle R. H $ ) ( ) R. $\mathrm{a}1_{\mathrm{c}\mathrm{o}\mathrm{c}}\mathrm{k}( )$ 1/3 1 1 $=$ 1 $=2$ 3 ( ) $\mathrm{p}_{\mathrm{a}}\mathrm{r}\mathrm{k}\mathrm{s}$ H. S. ( ) 600 $-\supset$

6 181 $\text{ }$ L\ eon Roches( ) 3 22 de Bellecourt ( ) ) ( L\check? ) ( \S 8; ) ( 1? ; ) (1865 )3 ermet de Cachon, C. Buland, L. Brin (1867)1 13 Ch. S. J. Chanoine( ) 5, 1O ( ), ( ), ( ), ( ), ( ), ( ; ) $\langle$ $\mathrm{j}$. Brunet)

7 (F. L. Verny; ) O \tau 198, 9361 (1 $=1$ ) (b b) ( ) ( 1)

8 L. Canal Paul Sarda( ) : : : : : : : ( ff) 3 =j lo (\S F) (Mg\hslash ) --( F) ( \langle ; ) ( ) 2

9 184 $\langle$4) $\langle$ 2 ) , C. H. Berson, S. liangeot, A. A. Dybouski F. F. $\mathrm{t}\mathrm{i}_{\mathrm{s}\mathrm{s}\mathrm{e}\mathrm{r}}\mathrm{a}\mathrm{n}\mathrm{d}$( ) J. Bertrand 16 3

10 185 $ \mathrm{i}$ $\langle$5) ( ) ( ) ( ) ( ) ( ) ( ) ( ) /3 ( ) ( ) $-$ 3

11 ( ) ( ) (, ) (John Ingles) 10 [ ) ( 13 ) 3 5

12 \mathrm{e}\mathrm{l}6\mathrm{m}\mathrm{e}\mathrm{n}\mathrm{t}\mathrm{s}$ de 187 (6 ) ( ) [ 13 2 ( ; 14 ) $(6\rangle$, ;, ( \rangle 10 ( ) r ( 5 ; ) V 6 r ( 13 ) 343 $\mathrm{e}$. $\mathrm{r}\mathrm{o}\mathrm{u}\mathrm{c}\mathrm{h}e;\mathrm{c}\mathrm{h}$. $\mathrm{d}\mathrm{e}$ Combrousse $ $\mathrm{g}^{\text{\ {e}}_{\mathrm{m}\text{\ {e}}}}\mathrm{t}\mathrm{r}\mathrm{i}\mathrm{e} (1874\text{ })$

13 $ $ $ $ r \sim (, 29, 1896 ) r (, 30, 1897 ) R. B. Wright $\alpha$ The Elements of Plane Geometry (4th. ed. ) $1879\text{ }$,, ( 16, ) University llege Hirst Wright Hirst lfright Dict. of National Biographies $<\mathrm{l}$. U. C. $>$ 1828 A. De liorgan 1831 G. P. J. White 1836 $\mathrm{n}_{-}\mathrm{u}_{\wedge r\alpha\phi \mathrm{n}}$ A $\mathrm{u}$. $\mathrm{d}\mathrm{c}1111^{-}.1$ $1\mathrm{O}l\cup$ r. lldlulllg. $\mathrm{c}\mathrm{l}\mathrm{e}\mathrm{i}\mathrm{f}\mathrm{f}\mathrm{o}\mathrm{r}\mathrm{d}$ $0.\mathrm{L}\infty \mathrm{g}\mathrm{w}.\mathrm{k}$ 1880 R. C. Rowe 1880 O. Henrici 1884 $\mathrm{h}\mathrm{i}11$ 11. J. U. K. Pearson $\ovalbox{\tt\small REJECT}\backslash$ U. C. 5 (1) (2), (3), (4)-(5) Algebra for Beginners ( ) ( 17, ) ( ) ( ) ;

14 , , , 3 (1914) $\langle$7) 1O (, 35 ) ( No. 19; ;pp. 1-88) $\mathrm{a}$) (. )J(Bibliotheca liath. Stat. No. 96;2000 ), ( ; 3, 1962 ), ( ; 3, ) ( 4 ) $-$ ( 2, 1971, ) ( 8 13 )

15 190 ( 1) (fiml\pm ) 100 }{ 70 50,, }) , \iota $<$ $>$ (\iota 40, \iota \iota }\iota t 5O }1 2O [ ]

40 $\mathrm{e}\mathrm{p}\mathrm{r}$ 45

40 $\mathrm{e}\mathrm{p}\mathrm{r}$ 45 ro 980 1997 44-55 44 $\mathrm{i}\mathrm{c}\mathrm{h}\mathrm{i}$ $-$ (Ko Ma $\iota_{\mathrm{s}\mathrm{u}\mathrm{n}}0$ ) $-$. $-$ $-$ $-$ $-$ $-$ $-$ 40 $\mathrm{e}\mathrm{p}\mathrm{r}$ 45 46 $-$. $\backslash

More information

42 1 ( ) 7 ( ) $\mathrm{s}17$ $-\supset$ 2 $(1610?\sim 1624)$ 8 (1622) (3 ), 4 (1627?) 5 (1628) ( ) 6 (1629) ( ) 8 (1631) (2 ) $\text{ }$ ( ) $\text{

42 1 ( ) 7 ( ) $\mathrm{s}17$ $-\supset$ 2 $(1610?\sim 1624)$ 8 (1622) (3 ), 4 (1627?) 5 (1628) ( ) 6 (1629) ( ) 8 (1631) (2 ) $\text{ }$ ( ) $\text{ 26 [\copyright 0 $\perp$ $\perp$ 1064 1998 41-62 41 REJECT}$ $=\underline{\not\equiv!}\xi*$ $\iota_{arrow}^{-}\approx 1,$ $\ovalbox{\tt\small ffl $\mathrm{y}

More information

Title Compactification theorems in dimens Topology and Related Problems) Author(s) 木村, 孝 Citation 数理解析研究所講究録 (1996), 953: Issue Date URL

Title Compactification theorems in dimens Topology and Related Problems) Author(s) 木村, 孝 Citation 数理解析研究所講究録 (1996), 953: Issue Date URL Title Compactification theorems in dimens Topology and Related Problems Authors 木村 孝 Citation 数理解析研究所講究録 1996 953 73-92 Issue Date 1996-06 URL http//hdlhandlenet/2433/60394 Right Type Departmental Bulletin

More information

128 Howarth (3) (4) 2 ( ) 3 Goldstein (5) 2 $(\theta=79\infty^{\mathrm{o}})$ : $cp_{n}=0$ : $\Omega_{m}^{2}=1$ $(_{\theta=80}62^{\mathrm{o}})$

128 Howarth (3) (4) 2 ( ) 3 Goldstein (5) 2 $(\theta=79\infty^{\mathrm{o}})$ : $cp_{n}=0$ : $\Omega_{m}^{2}=1$ $(_{\theta=80}62^{\mathrm{o}})$ 1075 1999 127-142 127 (Shintaro Yamashita) 7 (Takashi Watanabe) $\mathrm{n}\mathrm{a}\mathrm{k}\mathrm{a}\mathrm{m}\mathrm{u}\mathrm{f}\mathrm{a}\rangle$ (Ikuo 1 1 $90^{\mathrm{o}}$ ( 1 ) ( / \rangle (

More information

REJECT}$ 11^{\cdot}\mathrm{v}\mathrm{e}$ virtual turning point II - - new Stokes curve - (Shunsuke SASAKI) RIMS Kyoto University 1

REJECT}$ 11^{\cdot}\mathrm{v}\mathrm{e}$ virtual turning point II - - new Stokes curve - (Shunsuke SASAKI) RIMS Kyoto University 1 高階線型常微分方程式の変形におけるvirtual turning Titlepointの役割について (II) : 野海 - 山田方程式系のnew S curveについて ( 線型微分方程式の変形と仮想的変わり点 ) Author(s) 佐々木 俊介 Citation 数理解析研究所講究録 (2005) 1433: 65-109 Issue Date 2005-05 URL http://hdlhandlenet/2433/47420

More information

Yamanashi Gakuin University Yamanashi Gakuin University Yamanashi Gakuin University Yamanashi

More information

平成19年度

平成19年度 1 2 3 4 H 3 H CC N + 3 O H 3 C O CO CH 3 CH O CO O CH2 CH 3 P O O 5 H H H CHOH H H H N + CHOH CHOH N + CH CH COO- CHOH CH CHOH 6 1) 7 2 ) 8 3 ) 4 ) 9 10 11 12 13 14 15 16 17 18 19 20 A A 0 21 ) exp( )

More information

76 20 ( ) (Matteo Ricci ) Clavius 34 (1606) 1607 Clavius (1720) ( ) 4 ( ) \sim... ( 2 (1855) $-$ 6 (1917)) 2 (1866) $-4$ (1868)

76 20 ( ) (Matteo Ricci ) Clavius 34 (1606) 1607 Clavius (1720) ( ) 4 ( ) \sim... ( 2 (1855) $-$ 6 (1917)) 2 (1866) $-4$ (1868) $\mathrm{p}_{\mathrm{r}\mathrm{o}\mathrm{g}\mathrm{r}\mathrm{a}}\mathrm{m}\dagger 1$ 1064 1998 75-91 75 $-$ $\text{ }$ (Osamu Kota) ( ) (1) (2) (3) 1. 5 (1872) 5 $ \mathrm{e}t\mathrm{l}\mathrm{a}\mathrm{n}\mathrm{g}\mathrm{e}\mathrm{r}$

More information

TOKYO Bay CAR FERRY 142 143

TOKYO Bay CAR FERRY 142 143 140 141 TOKYO Bay CAR FERRY 142 143 145 144 146 147 149 148 150 1 2 3 4 5 6 7 8 9 : ; < = >? @ A B C D E F G H I J K L M N O P Q R S T U V W X Y Z [ \ ] ^ _ 151 153 152 155 154 156 157 159 158 161 160

More information

... 3... 3... 3... 3... 4... 7... 10... 10... 11... 12... 12... 13... 14... 15... 18... 19... 20... 22... 22... 23 2

... 3... 3... 3... 3... 4... 7... 10... 10... 11... 12... 12... 13... 14... 15... 18... 19... 20... 22... 22... 23 2 1 ... 3... 3... 3... 3... 4... 7... 10... 10... 11... 12... 12... 13... 14... 15... 18... 19... 20... 22... 22... 23 2 3 4 5 6 7 8 9 Excel2007 10 Excel2007 11 12 13 - 14 15 16 17 18 19 20 21 22 Excel2007

More information

Title DEA ゲームの凸性 ( 数理最適化から見た 凸性の深み, 非凸性の魅惑 ) Author(s) 中林, 健 ; 刀根, 薫 Citation 数理解析研究所講究録 (2004), 1349: Issue Date URL

Title DEA ゲームの凸性 ( 数理最適化から見た 凸性の深み, 非凸性の魅惑 ) Author(s) 中林, 健 ; 刀根, 薫 Citation 数理解析研究所講究録 (2004), 1349: Issue Date URL Title DEA ゲームの凸性 ( 数理最適化から見た 凸性の深み 非凸性の魅惑 ) Author(s) 中林 健 ; 刀根 薫 Citation 数理解析研究所講究録 (2004) 1349: 204-220 Issue Date 2004-01 URL http://hdl.handle.net/2433/24871 Right Type Departmental Bulletin Paper

More information

http://banso.cocolog-nifty.com/ 100 100 250 5 1 1 http://www.banso.com/ 2009 5 2 10 http://www.banso.com/ 2009 5 2 http://www.banso.com/ 2009 5 2 http://www.banso.com/ < /> < /> / http://www.banso.com/

More information

P-12 P-13 3 4 28 16 00 17 30 P-14 P-15 P-16 4 14 29 17 00 18 30 P-17 P-18 P-19 P-20 P-21 P-22

P-12 P-13 3 4 28 16 00 17 30 P-14 P-15 P-16 4 14 29 17 00 18 30 P-17 P-18 P-19 P-20 P-21 P-22 1 14 28 16 00 17 30 P-1 P-2 P-3 P-4 P-5 2 24 29 17 00 18 30 P-6 P-7 P-8 P-9 P-10 P-11 P-12 P-13 3 4 28 16 00 17 30 P-14 P-15 P-16 4 14 29 17 00 18 30 P-17 P-18 P-19 P-20 P-21 P-22 5 24 28 16 00 17 30 P-23

More information

$\mathrm{i}\mathrm{d}$ 15 ) Authorization ( ) Accounting ( ) UNIX Authentication ID Authorization Accounting $\sim-$ UNIX Authentication BSD Flat Data

$\mathrm{i}\mathrm{d}$ 15 ) Authorization ( ) Accounting ( ) UNIX Authentication ID Authorization Accounting $\sim-$ UNIX Authentication BSD Flat Data 2})$ $ \ulcorner^{-}$ 1446 2005 14-39 14 Central Authentication and Authorization Service -Web Applicatim - (Hisashi NAITO) (Shoji KAJITA) Graduate School of Mathematics Information Technology Center Nagoya

More information

$\hat{\grave{\grave{\lambda}}}$ $\grave{\neg}\backslash \backslash ^{}4$ $\approx \mathrm{t}\triangleleft\wedge$ $10^{4}$ $10^{\backslash }$ $4^{\math

$\hat{\grave{\grave{\lambda}}}$ $\grave{\neg}\backslash \backslash ^{}4$ $\approx \mathrm{t}\triangleleft\wedge$ $10^{4}$ $10^{\backslash }$ $4^{\math $\mathrm{r}\mathrm{m}\mathrm{s}$ 1226 2001 76-85 76 1 (Mamoru Tanahashi) (Shiki Iwase) (Toru Ymagawa) (Toshio Miyauchi) Department of Mechanical and Aerospaoe Engineering Tokyo Institute of Technology

More information

66~ 274~600 ~26,948 ~961. ~ 66~ 69~ ~ ~53

More information

n=360 28.6% 34.4% 36.9% n=360 2.5% 17.8% 19.2% n=64 0.8% 0.3% n=69 1.7% 3.6% 0.6% 1.4% 1.9% < > n=218 1.4% 5.6% 3.1% 60.6% 0.6% 6.9% 10.8% 6.4% 10.3% 33.1% 1.4% 3.6% 1.1% 0.0% 3.1% n=360 0% 50%

More information

O157 6/23 7/4 6 25 1000 117,050 6 14:00~15:30 1 2 22 22 14:30~15:30 8 12 1 5 20 6 20 10 11 30 9 10 6 1 30 6 6 0 30 6 19 0 3 27 6 20 0 50 1 2 6 4 61 1 6 5 1 2 1 2 6 19 6 4 15 6 1 6 30 6 24 30 59

More information

\mathrm{m}_{\text{ }}$ ( ) 1. :? $\dagger_{\vee}\mathrm{a}$ (Escherichia $(E.)$ co $l\mathrm{i}$) (Bacillus $(B.)$ subtilis) $0\mu

\mathrm{m}_{\text{ }}$ ( ) 1. :? $\dagger_{\vee}\mathrm{a}$ (Escherichia $(E.)$ co $l\mathrm{i}$) (Bacillus $(B.)$ subtilis) $0\mu \mathrm{m}_{\text{ }}$ 1453 2005 85-100 85 ( ) 1. :? $\dagger_{\vee}\mathrm{a}$ (Escherichia $(E.)$ co $l\mathrm{i}$) (Bacillus $(B.)$ subtilis) $0\mu 05\sim 1 $2\sim 4\mu \mathrm{m}$ \nearrow $\mathrm{a}$

More information

取扱説明書

取扱説明書 ED-601 ED-501 ED-401 2 3 4 23 14 5 6 18 10 7 1 2 6 3 4 8 9 16 16 16 12 1 2 18 10 2 1 5 12 11 1 2 1 2 12 1 2 13 16 14 3 2 4 1 1 2 16 3 4 18 15 1 2 16 2 3 1 1 2 3 18 17 18 22 19 D A C 20 A B 22 B C D 22

More information

項 目

項 目 1 1 2 3 11 4 6 5 7,000 2 120 1.3 4,000 04 450 < > 5 3 6 7 8 9 4 10 11 5 12 45 6 13 E. 7 B. C. 14 15 16 17 18 19 20 21 22 23 8 24 25 9 27 2 26 6 27 3 1 3 3 28 29 30 9 31 32 33 500 1 4000 0 2~3 10 10 34

More information

110 $\ovalbox{\tt\small REJECT}^{\mathrm{i}}1W^{\mathrm{p}}\mathrm{n}$ 2 DDS 2 $(\mathrm{i}\mathrm{y}\mu \mathrm{i})$ $(\mathrm{m}\mathrm{i})$ 2

110 $\ovalbox{\tt\small REJECT}^{\mathrm{i}}1W^{\mathrm{p}}\mathrm{n}$ 2 DDS 2 $(\mathrm{i}\mathrm{y}\mu \mathrm{i})$ $(\mathrm{m}\mathrm{i})$ 2 1539 2007 109-119 109 DDS (Drug Deltvery System) (Osamu Sano) $\mathrm{r}^{\mathrm{a}_{w^{1}}}$ $\mathrm{i}\mathrm{h}$ 1* ] $\dot{n}$ $\mathrm{a}g\mathrm{i}$ Td (Yisaku Nag$) JST CREST 1 ( ) DDS ($\mathrm{m}_{\mathrm{u}\mathrm{g}}\propto

More information

Title ゾウリムシの生物対流実験 ( 複雑流体の数理とその応用 ) Author(s) 狐崎, 創 ; 小森, 理絵 ; 春本, 晃江 Citation 数理解析研究所講究録 (2006), 1472: Issue Date URL

Title ゾウリムシの生物対流実験 ( 複雑流体の数理とその応用 ) Author(s) 狐崎, 創 ; 小森, 理絵 ; 春本, 晃江 Citation 数理解析研究所講究録 (2006), 1472: Issue Date URL Title ゾウリムシの生物対流実験 ( 複雑流体の数理とその応用 ) Author(s) 狐崎, 創 ; 小森, 理絵 ; 春本, 晃江 Citation 数理解析研究所講究録 (2006), 1472: 129-138 Issue Date 2006-02 URL http://hdl.handle.net/2433/48126 Right Type Departmental Bulletin

More information

●70974_100_AC009160_KAPヘ<3099>ーシス自動車約款(11.10).indb

●70974_100_AC009160_KAPヘ<3099>ーシス自動車約款(11.10).indb " # $ % & ' ( ) * +, -. / 0 1 2 3 4 5 6 7 8 9 : ; < = >? @ A B C D E F G H I J K L M N O P Q R S T U V W X Y " # $ % & ' ( ) * + , -. / 0 1 2 3 4 5 6 7 8 9 : ; < = > ? @ A B

More information

野岩鉄道の旅

野岩鉄道の旅 29th 5:13 5:34 5:56 6:00 6:12 6:20 6:21 6:25 6:29 6:31 6:34 6:38 6:40 6:45 6:52 6:56 7:01 7:07 7:11 7:32 7:34 7:50 7:58 8:03 8:17 8:36 8:44 5:50 5:54 6:15 6:38 6:39 6:51 6:59 6:59 7:03 7:08 7:08 7:11 7:15

More information

日経テレコン料金表(2016年4月)

日経テレコン料金表(2016年4月) 1 2 3 4 8,000 15,000 22,000 29,000 5 6 7 8 36,000 42,000 48,000 54,000 9 10 20 30 60,000 66,000 126,000 166,000 50 100 246,000 396,000 1 25 8,000 7,000 620 2150 6,000 4,000 51100 101200 3,000 1,000 201

More information

73 p.1 22 16 2004p.152

73 p.1 22 16 2004p.152 1987 p.80 72 73 p.1 22 16 2004p.152 281895 1930 1931 12 28 1930 10 27 12 134 74 75 10 27 47.6 1910 1925 10 10 76 10 11 12 139 p.287 p.10 11 pp.3-4 1917 p.284 77 78 10 13 10 p.6 1936 79 15 15 30 80 pp.499-501

More information

122011pp.139174 18501933

122011pp.139174 18501933 122011pp.139174 18501933 122011 1850 3 187912 3 1850 8 1933 84 4 1871 12 1879 5 2 1 9 15 1 1 5 3 3 3 6 19 9 9 6 28 7 7 4 1140 9 4 3 5750 58 4 3 1 57 2 122011 3 4 134,500,000 4,020,000 11,600,000 5 2 678.00m

More information

2 2 3 4 5 5 2 7 3 4 6 1 3 4 7 4 2 2 2 4 2 3 3 4 5 1932 A p. 40. 1893 A p. 224, p. 226. 1893 B pp. 1 2. p. 3.

2 2 3 4 5 5 2 7 3 4 6 1 3 4 7 4 2 2 2 4 2 3 3 4 5 1932 A p. 40. 1893 A p. 224, p. 226. 1893 B pp. 1 2. p. 3. 1 73 72 1 1844 11 9 1844 12 18 5 1916 1 11 72 1 73 2 1862 3 1870 2 1862 6 1873 1 3 4 3 4 7 2 3 4 5 3 5 4 2007 p. 117. 2 2 3 4 5 5 2 7 3 4 6 1 3 4 7 4 2 2 2 4 2 3 3 4 5 1932 A p. 40. 1893 A p. 224, p. 226.

More information

29 2011 3 4 1 19 5 2 21 6 21 2 21 7 2 23 21 8 21 1 20 21 1 22 20 p.61 21 1 21 21 1 23

29 2011 3 4 1 19 5 2 21 6 21 2 21 7 2 23 21 8 21 1 20 21 1 22 20 p.61 21 1 21 21 1 23 29 2011 3 pp.55 86 19 1886 2 13 1 1 21 1888 1 13 2 3,500 3 5 5 50 4 1959 6 p.241 21 1 13 2 p.14 1988 p.2 21 1 15 29 2011 3 4 1 19 5 2 21 6 21 2 21 7 2 23 21 8 21 1 20 21 1 22 20 p.61 21 1 21 21 1 23 1

More information

Microsoft Word - 映画『東京裁判』を観て.doc

Microsoft Word - 映画『東京裁判』を観て.doc 1 2 3 4 5 6 7 1 2008. 2 2010, 3 2010. p.1 4 2008 p.202 5 2008. p.228 6 2011. 7 / 2008. pp.3-4 1 8 1 9 10 11 8 2008, p.7 9 2011. p.41 10.51 11 2009. p. 2 12 13 14 12 2008. p.4 13 2008, p.7-8 14 2008. p.126

More information

() L () 20 1

() L () 20 1 () 25 1 10 1 0 0 0 1 2 3 4 5 6 2 3 4 9308510 4432193 L () 20 1 PP 200,000 P13P14 3 0123456 12345 1234561 2 4 5 6 25 1 10 7 1 8 10 / L 10 9 10 11 () ( ) TEL 23 12 7 38 13 14 15 16 17 18 L 19 20 1000123456

More information

308 ( ) p.121

308 ( ) p.121 307 1944 1 1920 1995 2 3 4 5 308 ( ) p.121 309 10 12 310 6 7 ( ) ( ) ( ) 50 311 p.120 p.142 ( ) ( ) p.117 p.124 p.118 312 8 p.125 313 p.121 p.122 p.126 p.128 p.156 p.119 p.122 314 p.153 9 315 p.142 p.153

More information

戦後の補欠選挙

戦後の補欠選挙 1 2 11 3 4, 1968, p.429., pp.140-141. 76 2005.12 20 14 5 2110 25 6 22 7 25 8 4919 9 22 10 11 12 13 58154 14 15 1447 79 2042 21 79 2243 25100 113 2211 71 113 113 29 p.85 2005.12 77 16 29 12 10 10 17 18

More information

untitled

untitled 280 200 5 7,800 6 8,600 28 1 1 18 7 8 2 ( 31 ) 7 42 2 / / / / / / / / / / 1 3 (1) 4 5 3 1 1 1 A B C D 6 (1) -----) (2) -- ()) (3) ----(). ()() () ( )( )( )( ) ( ) ( )( )( )( ) () (). () ()() 7 () ( ) 1

More information

$\mathrm{v}$ ( )* $*1$ $\ovalbox{\tt\small REJECT}*2$ \searrow $\mathrm{b}$ $*3$ $*4$ ( ) [1] $*5$ $\mathrm{a}\mathrm{c}

$\mathrm{v}$ ( )* $*1$ $\ovalbox{\tt\small REJECT}*2$ \searrow $\mathrm{b}$ $*3$ $*4$ ( ) [1] $*5$ $\mathrm{a}\mathrm{c} Title 狩野本 綴術算経 について ( 数学史の研究 ) Author(s) 小川 束 Citation 数理解析研究所講究録 (2004) 1392: 60-68 Issue Date 2004-09 URL http://hdlhandlenet/2433/25859 Right Type Departmental Bulletin Paper Textversion publisher Kyoto

More information

106 (2 ( (1 - ( (1 (2 (1 ( (1(2 (3 ( - 10 (2 - (4 ( 30 (? (5 ( 48 (3 (6 (

106 (2 ( (1 - ( (1 (2 (1 ( (1(2 (3 ( - 10 (2 - (4 ( 30 (? (5 ( 48 (3 (6 ( 1195 2001 105-115 105 Kinki Wasan Seminar Tatsuo Shimano, Yasukuni Shimoura, Saburo Tamura, Fumitada Hayama A 2 (1574 ( 8 7 17 8 (1622 ( 1 $(1648\text{ }$ - 77 ( 1572? (1 ( ( (1 ( (1680 1746 (6 $-$.. $\square

More information

取扱説明書 [F-02F]

取扱説明書 [F-02F] F-02F 4. 2 3 4 5 6 7 8 9 0 2 3 4 5 6 7 8 a b c d a b c d a b cd 9 e a b c d e 20 2 22 ab a b 23 a b 24 c d e 25 26 o a b c p q r s t u v w d h i j k l e f g d m n a b c d e f g h i j k l m n x 27 o

More information

複数の $\delta$ 関数を初期データに持つ非線形シュレー Titleディンガー方程式について ( スペクトル 散乱理論とその周辺 ) Author(s) 北, 直泰 Citation 数理解析研究所講究録 (2006), 1479: Issue Date URL

複数の $\delta$ 関数を初期データに持つ非線形シュレー Titleディンガー方程式について ( スペクトル 散乱理論とその周辺 ) Author(s) 北, 直泰 Citation 数理解析研究所講究録 (2006), 1479: Issue Date URL 複数の $\delta$ 関数を初期データに持つ非線形シュレー Titleディンガー方程式について ( スペクトル 散乱理論とその周辺 ) Author(s) 北 直泰 Citation 数理解析研究所講究録 (2006) 1479: 142-161 Issue Date 2006-04 URL http://hdlhandlenet/2433/58020 Right Type Departmental

More information

1 1 Emmons (1) 2 (2) 102

1 1 Emmons (1) 2 (2) 102 1075 1999 101-116 101 (Yutaka Miyake) 1. ( ) 1 1 Emmons (1) 2 (2) 102 103 1 2 ( ) : $w/r\omega$ $\text{ }$ 104 (3) $ $ $=-$ 2- - $\mathrm{n}$ 2. $\xi_{1}(=\xi),$ $\xi 2(=\eta),$ $\xi 3(=()$ $x,$ $y,$ $z$

More information

簡易入力システム(よくある質問集)

簡易入力システム(よくある質問集) 1 1. 4 2. 5 3. 6 3.1.... 6 3.2.... 8 3.3.... 10 3.4.... 12 4. 13 5. 20 6. 21 7. 22 23 1.... 24 2.... 38 3.... 39 4.... 58 5.... 59 61 1.... 61 1.1.... 61... 61... 63... 64 2... 65 2... 66 2... 67... 68...

More information

南極倶楽部会報 南極第6号

南極倶楽部会報 南極第6号 ,.. -57- .., -58- -59- . -60- -61- ( km m.p. ) m.p. km km m.p. m.p. LT LT -62- m.p. m.p. LT LT m.p. LT m.p. LT m.p. ( ) LT LT Lo m.p. -63- LT LT LT LT LT LT Lo LT -64- LT LT LT LT Bar -65- LT.... -66-

More information

(Kazuyuki Hasegawa) Department of Mathematics Faculty of Science Science University of Tokyo 1 ff ( ) ([2] [3] [4] [6]) $\nabla$

(Kazuyuki Hasegawa) Department of Mathematics Faculty of Science Science University of Tokyo 1 ff ( ) ([2] [3] [4] [6]) $\nabla$ Title 二次超曲面へのアファインはめ込みの基本定理とその応用 ( 部分多様体の幾何学 ) Author(s) 長谷川 和志 Citation 数理解析研究所講究録 (2001) 1206 107-113 Issue Date 2001-05 URL http//hdlhandlenet/2433/41034 Right Type Departmental Bulletin Paper Textversion

More information

untitled

untitled ...1... 3 1... 3 2... 4 3... 4 4... 5...... 6 1... 6 2... 7 3... 8 4... 9 5... 10... 12 1... 12 2... 13 3... 14 4... 16...... 19 1... 19 2... 20 3... 22 4... 24...... 25... 26 1... 26 2... 26 3... 26......

More information

Archimedean Spiral 1, ( ) Archimedean Spiral Archimedean Spiral ( $\mathrm{b}.\mathrm{c}$ ) 1 P $P$ 1) Spiral S

Archimedean Spiral 1, ( ) Archimedean Spiral Archimedean Spiral ( $\mathrm{b}.\mathrm{c}$ ) 1 P $P$ 1) Spiral S Title 初期和算にみる Archimedean Spiral について ( 数学究 ) Author(s) 小林, 龍彦 Citation 数理解析研究所講究録 (2000), 1130: 220-228 Issue Date 2000-02 URL http://hdl.handle.net/2433/63667 Right Type Departmental Bulletin Paper Textversion

More information

$/\mathrm{t}\mathrm{a}\mathrm{k}\mathrm{a}\mathrm{y}\mathrm{a}$ MIYANO E mail: hirosaki-u.ac.jp 1 ( ) ( ) 1980

$/\mathrm{t}\mathrm{a}\mathrm{k}\mathrm{a}\mathrm{y}\mathrm{a}$ MIYANO E mail: hirosaki-u.ac.jp 1 ( ) ( ) 1980 Title 非線形時系列解析によるカオス性検定 ( 非線形解析学と凸解析学の研究 ) Author(s) 宮野, 尚哉 Citation 数理解析研究所講究録 (2000), 1136: 28-36 Issue Date 2000-04 URL http://hdl.handle.net/2433/63786 Right Type Departmental Bulletin Paper Textversion

More information

\mathrm{n}\circ$) (Tohru $\mathrm{o}\mathrm{k}\mathrm{u}\mathrm{z}\circ 1 $(\mathrm{f}_{\circ \mathrm{a}}\mathrm{m})$ ( ) ( ). - $\

\mathrm{n}\circ$) (Tohru $\mathrm{o}\mathrm{k}\mathrm{u}\mathrm{z}\circ 1 $(\mathrm{f}_{\circ \mathrm{a}}\mathrm{m})$ ( ) ( ). - $\ 1081 1999 84-99 84 \mathrm{n}\circ$) (Tohru $\mathrm{o}\mathrm{k}\mathrm{u}\mathrm{z}\circ 1 $(\mathrm{f}_{\circ \mathrm{a}}\mathrm{m})$ ( ) ( ) - $\text{ }$ 2 2 ( ) $\mathrm{c}$ 85 $\text{ }$ 3 ( 4 )

More information

$6\mathrm{V}\mathrm{I}\mathrm{I}\mathrm{I}$ (p (Kazuhiro Sakuma) Dept. of Math. and Phys., Kinki Univ.,. (,,.) \S 0. $C^{\infty

$6\mathrm{V}\mathrm{I}\mathrm{I}\mathrm{I}$ (p (Kazuhiro Sakuma) Dept. of Math. and Phys., Kinki Univ.,. (,,.) \S 0. $C^{\infty $6\mathrm{V}\mathrm{I}\mathrm{I}\mathrm{I}$ (p 1233 2001 111-121 111 (Kazuhiro Sakuma) Dept of Math and Phys Kinki Univ ( ) \S 0 $M^{n}$ $N^{p}$ $n$ $p$ $f$ $M^{n}arrow N^{p}$ $n

More information

}\llcorner\backslash$ : (Michiyo Nakane) Seijo University St Pauls University 1 \searrow Maxwell Maxwell 1 Maxwe Maxwe $\mathrm{a}\ma

}\llcorner\backslash$ : (Michiyo Nakane) Seijo University St Pauls University 1 \searrow Maxwell Maxwell 1 Maxwe Maxwe $\mathrm{a}\ma Title 最近の数学史の研究方法 : 数学史のオリジナリティーとは何か ( 数学史の研究 ) Author(s) 中根 美知代 Citation 数理解析研究所講究録 (2002) 1257: 1-12 Issue Date 2002-04 URL http://hdlhandlenet/2433/41921 Right Type Departmental Bulletin Paper Textversion

More information

2

2 1 2 119 119 5 500 1 30 102 1 113 3 4 120 2 3 113 5 230 1 1 3 4 5 6 7 8 1 support@kansen.sakura.ne.jp 2 9 3 ( ) 10 11 12 4 1. 2. 3. 4. 13 5 14 15 16 17 18 19 [ ] [ ] 20 [ ] [ ] [ ] 21 22 [ ] 23 < > < >

More information

$\text{ ^{ } }\dot{\text{ }}$ KATSUNORI ANO, NANZAN UNIVERSITY, DERA MDERA, MDERA 1, (, ERA(Earned Run Average) ),, ERA 1,,

$\text{ ^{ } }\dot{\text{ }}$ KATSUNORI ANO, NANZAN UNIVERSITY, DERA MDERA, MDERA 1, (, ERA(Earned Run Average) ),, ERA 1,, 併殺を考慮したマルコフ連鎖に基づく投手評価指標とそ Titleの 1997 年度日本プロ野球シーズンでの考察 ( 最適化のための連続と離散数理 ) Author(s) 穴太, 克則 Citation 数理解析研究所講究録 (1999), 1114: 114-125 Issue Date 1999-11 URL http://hdlhandlenet/2433/63391 Right Type Departmental

More information

Microsoft Excelを用いた分子軌道の描画の実習

Microsoft Excelを用いた分子軌道の描画の実習 J. Comput. Chem. Jpn.,Vol.9, No.4, pp.177 182 (2010) 2010 Society of Computer Chemistry, Japan Microsoft Excel a*, b, c a, 790-8577 2-5 b, 350-0295 1-1 c, 305-8568 1-1-1 *e-mail: nagaoka@ehimegw.dpc.ehime-u.ac.jp

More information