컨텐츠 시작
학술대회/행사
초록검색
| 제출번호(No.) | 0550 |
|---|---|
| 분류(Section) | Invited Talk |
| 분과(Session) | Algebra / Representation Theory / Lie Theory (SS-02) |
| 영문제목 (Title(Eng.)) |
Monodromy and arithmetic groups |
| 저자(Author(s)) |
Tyakal Venkataramana1 Tata Institute of Fundamental Research, India1 |
| 초록본문(Abstract) | We show that the monodromy of degree $d$ cyclic coverings of the projective line with fixed ramification data is arithmetic provided the the number of ramification points excluding infinity is at least $2d+1$, and the ramification degrees are co-prime to the degree $d$. We review applications to monodromy of hypergeometric functions and to complex reflection groups. . |
| 분류기호 (MSC number(s)) |
22E40 |
| 키워드(Keyword(s)) | braid group monodromy, arithmetic group |
| 강연 형태 (Language of Session (Talk)) |
English |