Extended confluent hypergeometric function

Applied Mathematics and Computation, 2004
The functions under consideration are the extended Gaussian hypergeometric function \[ F_p(a,b;c,z)= {1\over B(b,c- b)} \int^1_0 t^{b-1}(1- t)^{c-b-1}(1- zt)^{-a}\exp\Biggl[-{p\over t(1- t)}\Biggr]\,dt \] and its confluent counterpart \(\Phi_p(b;c;z)\) with \(\exp(zt)\) in place of \((1- zt)^{-a}\). The authors discuss differentiation with respect to \(
M. Aslam Chaudhry +3 more
openaire +4 more sources

Applications of Inequalities in the Complex Plane Associated with Confluent Hypergeometric Function

Symmetry, 2021
The idea of inequality has been extended from the real plane to the complex plane through the notion of subordination introduced by Professors Miller and Mocanu in two papers published in 1978 and 1981. With this notion came a whole new theory called the
Georgia Irina Oros, Oros Georgia Irina
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Algorithm 707: CONHYP: a numerical evaluator of the confluent hypergeometric function for complex arguments of large magnitudes

ACM Transactions on Mathematical Software, 1992
A numerical evaluator for the confluent hypergeometric function for complex arguments with large magnitudes using a direct summation of Kummer\u27s series is presented.
Nardin, Mark, Perger, W. F., Bhalla, Atul +2 more
exaly +2 more sources

Numerical evaluation of the confluent hypergeometric function for complex arguments of large magnitudes

Journal of Computational and Applied Mathematics, 1992
A numerical evaluator for the confluent hypergeometric function for complexarguments with large magnitudes using a direct summation of Kummer's series is described.
Perger, W.F. +3 more
exaly +2 more sources

extended beta function
mathematics
confluent hypergeometric function

gamma function
gamma, beta and polygamma functions
classical hypergeometric functions, \ {}_2f_1\

beta distribution
hypergeometric function
mellin transform