Asymptotic expansions of Kummer hypergeometric functions for large values of the parameters

Abstract

We derive asymptotic expansions of the Kummer functions M(a,b,z) and U(a,b+1,z) for large positive values of a and b, with z fixed. For both functions we consider b/a 1 and b/a 1, with special attention for the case a b. We use a uniform method to handle all cases of these parameters.