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for exponential series sections. They lead to more general conjecture on monotonicity of ratios of Kummer

The monomial of solutions to a reduced system of algebraic equations are a hypergeometric type

hypergeometric series that are solutions of the same system of partial differential equations, which is also

bicircle are constructed in which F1 is determined by a double hypergeometric series. For the indicated

In this paper we prove monotonicity of some ratios of q-Kummer confluent hypergeometric and q-hypergeometric

hypergeometric series depending on three variables and belonging to the Horn class. We have derived

We prove that any simplicial or parallelepipedal hypergeometric configuration admits a Puiseux

to represent this function as exponentially converging hypergeometric series in the complement

originally by an N-variate hypergeometric series. Such formulae represent F(N) D in suitable subdomains of CN

hypergeometric series, confluent hypergeometric functions of one and two variables, and generalized

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