Title of article
Solving the hypergeometric system of Okubo type in terms of a certain generalized hypergeometric function
Author/Authors
Werner Balser، نويسنده , , Claudia R?scheisen، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2009
Pages
10
From page
2485
To page
2494
Abstract
We introduce one scalar function f of a complex variable and finitely many parameters, which allows to represent all solutions of the so-called hypergeometric system of Okubo type under the assumption that one of the two coefficient matrices has all distinct eigenvalues. In the simplest non-trivial situation, f is equal to the hypergeometric function, while in other more complicated cases it is related, but not equal, to the generalized hypergeometric functions. In general, however, this function appears to be a new higher transcendental one. The coefficients of the power series of f about the origin can be explicitly given in terms of a generalized version of the classical Pochhammer symbol, involving two square matrices that in general do not commute. The function can also be characterized by a Volterra integral equation, whose kernel is expressed in terms of the solutions of another hypergeometric system of lower dimension.
Keywords
Ordinary differential equationsPower series solutionsGeneralized hypergeometric functions
Journal title
JOURNAL OF DIFFERENTIAL EQUATIONS
Serial Year
2009
Journal title
JOURNAL OF DIFFERENTIAL EQUATIONS
Record number
751607
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