No.501
変換群と表現論
Transformation Groups and Representation Theory
 
1983/06/15〜1983/06/17
服部 晶夫
HATTORI,AKIO
 
目 次
 
1. FINITENESS OF SYMMETRIES ON 3-MANIFOLDS(TRANSFORMATION GROUPS AND REPRESENTATION THEORY)------------------------------------------1
    Tokyo Metropolitan University   小島 定吉 (KOJIMA, Sadayoshi)
 
2. On 3-manifolds with no periodic maps(TRANSFORMATION GROUPS AND REPRESENTATION THEORY)---------------------------------------------6
    大阪市立大学理学部   河内 明夫 (Kawauchi, Akio)
 
3. The Geometry of Polycyclic groups of rank three(TRANSFORMATION GROUPS AND REPRESENTATION THEORY)---------------------------------21
    東京大学理学部   後藤 寿史 (Goto, Hisashi)
 
4. The fundamental group of a compact flat Lorentz space form is virtually polycyclic(TRANSFORMATION GROUPS AND REPRESENTATION THEORY)---32
    M.I.T. / 北海道大学理学部   Goldman W. / 神島 芳宣 (Goldman, W. / Kamishima, Y.)
 
5. 置換類群のtorsion part(変換群と表現論)-------------------------------------------------------------------------------------------49
    大阪市立大学   宮田 武彦 (Miyata, Takehiko)
 
6. Rational Smith Equivalence of Representations(TRANSFORMATION GROUPS AND REPRESENTATION THEORY)-----------------------------------74
    Rutgers University, University of Tokyo   Petrie, Ted
 
7. On a question concerned with a concordance relation of G-complexes(TRANSFORMATION GROUPS AND REPRESENTATION THEORY)--------------86
    大阪大学理学部   森本 雅治 (Morimoto, Masaharu)
 
8. Finite coverings of punctured torus bundles and the first Betti number(TRANSFORMATION GROUPS AND REPRESENTATION THEORY)----------99
    東京大学教養学部   森田 茂之 (MORITA, Shigeyuki)
 
9. Semi-free S$^1$-actions on homotopy spheres and higher dimensional knots(TRANSFORMATION GROUPS AND REPRESENTATION THEORY)-------118
    東京大学理学部   枡田 幹也 (Masuda, Mikiya)
 
10. Semisimple degree of symmetry of manifolds with the homotopy type of S$^{n_1}x$...xS$^{n_k} (n_i$ = 1,2,3)(TRANSFORMATION GROUPS AND REPRESENTATION THEORY)---136
    新潟大学理学部   渡部 剛 (Watabe, Tsuyoshi)
 
11. Actions of symplectic groups on a product of projective spaces(TRANSFORMATION GROUPS AND REPRESENTATION THEORY)----------------144
    国際基督教大学 / 山形大学理学部   中西 あい子 / 内田 伏一 (NAKANISHI, Aiko / UCHIDA, Fuichi)