Uniform asymptotic expansions for the Whittaker functions   $M_{\kappa,\mu}(z)$ and $W_{\kappa,\mu}(z)$ with $\mu$ large

T. M. Dunster

arXiv:2104.12912·math.CA·September 15, 2021

Uniform asymptotic expansions for the Whittaker functions $M_{\kappa,\mu}(z)$ and $W_{\kappa,\mu}(z)$ with $\mu$ large

T. M. Dunster

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Abstract

Uniform asymptotic expansions are derived for Whittaker's confluent hypergeometric functions $M_{κ, μ} (z)$ and $W_{κ, μ} (z)$ , as well as the numerically satisfactory companion function $W_{- κ, μ} (z e^{- π i})$ . The expansions are uniformly valid for $μ \to \infty$ , $0 \leq κ / μ \leq 1 - δ < 1$ , and for $0 \leq ar g (z) \leq π$ . By using appropriate connection and analytic continuation formulas these expansions can be extended to all unbounded nonzero complex $z$ . The approximations come from recent asymptotic expansions involving elementary functions and Airy functions, and explicit error bounds are either provided or available.

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