| |
1
|
Beukers, F., Heckman, G.: Monodromy for the hypergeometric function n~n-x. Invent. Math., 95 (1989), 325-354.
|
| |
2
|
Erd~lyi, A.: Higher transcendental functions, Vol 1. New York, McGraw-Hill 1953.
|
| |
3
|
Kohno, M. and Suzuki, M.,: Reduction of single Fuchsian differential equations to hypergeometric systems, K~m~moto J. s~i. (M~ta) , 17 (~987), 27-74.
|
| |
4
|
Levelt, A.H.M.: Hypergeometric functions. Amsterdam 1961.
|
| |
5
|
Okubo, K. : On the group of Fuchsian equations. Mathematical Seminar Report, Tokyo Metropolitan University, 1987.
|
| |
6
|
Okubo, K., Takano, K. and Yoshida, S.: A connection problem for the generalized hypergeometric equation, Funkcial. ~kvac., 31 (1988), 483-495.
|
| |
7
|
Riemann, B.: Collected Works of B. Riemann, New York: Dover, 1953.
|
| |
8
|
Sasai, T.: On ~ monodromy group and irreducibility conditions of a fourth order differenti&l systems of Okubo-type, J. Reine Angw. Math., 299/300 (1978), 38-50.
|
| |
9
|
: Generalized hypergeometric equations with finite monodromy groups (in Japanese), RIMS Kokyuroku, Kyoto University, 681 (1989), 123-139.
|
| |
10
|
Schwarz, H.A.' Ueber diejenigen FKlle, in welchen die Gaussische hypergeometrische Reihe eine algebraische Funktion ihres vierten Elementes darstellt. J. Reine Angew. Math., 75 (1873), 292-335.
|
| |
11
|
Shephard, G.C. and Todd, J.A.: Finite unitary reflection groups. Can. J. Math., 6 (1954), 274-304.
|
| |
12
|
Springer, T.A.: Regulax elements of finite reflection groups. Invent. Math., 25 (1974), 159-198.
|
| |
13
|
Takano, K. and Bannai, E. : A global study of Jordan-Pochhammer differential equations. FunkciaL Ekvac., 19 (1976), 85-99.
|
| |
14
|
Yokoyama, T.: A system of total differential equations of two variables and its monodromy group. Preprini.
|
| |
15
|
Yoshida, M.: Fuchsian differential equations. Braunschweig:Vieveg 1987.
|
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