A naive-topological study of the contiguity relations for hypergeometric functions

Masaaki Yoshida

Banach Center Publications (2005)

  • Volume: 69, Issue: 1, page 257-268
  • ISSN: 0137-6934

Abstract

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When the parameters are real, the hypergeometric equation defines a Schwarz triangle. We study a combinatorial-topological property of the Schwarz triangle when the three angles are not necessarily less than π.

How to cite

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Masaaki Yoshida. "A naive-topological study of the contiguity relations for hypergeometric functions." Banach Center Publications 69.1 (2005): 257-268. <http://eudml.org/doc/282456>.

@article{MasaakiYoshida2005,
abstract = {When the parameters are real, the hypergeometric equation defines a Schwarz triangle. We study a combinatorial-topological property of the Schwarz triangle when the three angles are not necessarily less than π.},
author = {Masaaki Yoshida},
journal = {Banach Center Publications},
keywords = {hypergeometric differential equation; contiguity relations for hypergeometric differential equation},
language = {eng},
number = {1},
pages = {257-268},
title = {A naive-topological study of the contiguity relations for hypergeometric functions},
url = {http://eudml.org/doc/282456},
volume = {69},
year = {2005},
}

TY - JOUR
AU - Masaaki Yoshida
TI - A naive-topological study of the contiguity relations for hypergeometric functions
JO - Banach Center Publications
PY - 2005
VL - 69
IS - 1
SP - 257
EP - 268
AB - When the parameters are real, the hypergeometric equation defines a Schwarz triangle. We study a combinatorial-topological property of the Schwarz triangle when the three angles are not necessarily less than π.
LA - eng
KW - hypergeometric differential equation; contiguity relations for hypergeometric differential equation
UR - http://eudml.org/doc/282456
ER -

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