Generalized Euler integrals and A-hypergeometric functions

Schneider and Stuhler have defined Euler᎐Poincare functions of irreducible ŕepresentations of reductive p-adic groups and calculated their orbital integrals. Orbital integrals belong to a larger family of invariant distributions appearing in the geometric side of the Arthur᎐Selberg trace formula. We

We deal with a class of integral transformations whose kernels contain the Clausenian hypergeometric function 3 F 2 (a 1 ; a 2 ; a 3 ; b 1 ; b 2 ; z). These transforms are deÿned in terms of integrals with respect to their parameters. It involves as particular cases the familiar Olevskii and general

We prove some convexity properties for a sum of hypergeometric functions and obtain a generalization of Legendre's relation for complete elliptic integrals. We apply these results to prove some inequalities for hypergeometric functions, incomplete beta-functions, and Legendre functions.