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Analytic continuation of the Kampé de Fériet function and the general double Horn series to represent this function as exponentially converging hypergeometric series in the complement
Analytic continuation of Lauricella's function F D(N) for large in modulo variables near hyperplanes {z j = z l}We consider the Lauricella hypergeometric function (Formula presented.), depending on (Formula
Analytic continuation of the Lauricella function with arbitrary number of variablesThe Lauricella function F(N) D, which is a generalized hypergeometric function of N variables
On monotonicity of ratios of some q-hypergeometric functions results we apply methods developed for the case of classical Kummer and Gauss hypergeometric functions
Convergence of two-dimensional hypergeometric series for algebraic functionsDescription of convergence domains for multiple power series is a quite difficult problem. In 1889
Sparse hypergeometric systems = Разреженные гипергеометрические системыSparse hypergeometric systems = Разреженные гипергеометрические системы
Sparse hypergeometric systemsSparse hypergeometric systems
On monotonicity of ratios of some hypergeometric functions hypergeometric functions and were not proved from 1993. In this paper we prove some conjectures from [1
A study of generalized hypergeometric Matrix functions via two-parameter Mittag-Leffler matrix function and confluent hypergeometric matrix functions by using two-parameter Mittag-Leffler matrix function
Hypergeometric Systems with Polynomial BasesWe prove that any simplicial or parallelepipedal hypergeometric configuration admits a Puiseux
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