1 Department of Mathematics and Statistics, Université de Moncton, Moncton, Canada. 2 The Applied Multivariate Research Group, Université de Moncton, Moncton, Canada. 3 Department of Mathematics and ...

Hypergeometric functions are generalized from transcendental functions. The function and series we use in quantitative economics can be evaluated analytically and expressed in form of hypergeometric ...

Supercongruences are congruences between special values of truncated hypergeometric series that hold modulo high powers of primes. Originally motivated by Ramanujan’s remarkable formulae for 1/π, ...

The principle aim of this research article is to investigate the properties of k-fractional integration introduced and defined by Mubeen and Habibullah [1],and secondly to solve the integral equation ...

This is Euler's hypergeometric differential equation. The hypergeometric function known also as Gauss' function is defined by the hypergeometric series \begin{equation*} _{2}F_{1} \left ...

Abstract: The Wright function, which arises in the theory of the space-time fractional diffusion equation, is an interesting mathematical object which has diverse connections with other special and ...

We have some implementations of hypergeometric functions in the Math library (and more to come), that would be good to expose: 2F1: gradients partially implemented (Expand grad_2F1 to calculate ...