Notes on Generalized Gr\"otzsch Ring Function and Generalized Hersch-Pfluger Distortion Function

Abstract

For a∈(0,1), r∈(0,1) and K∈(1,∞), let μa(r) and Ka(r) be the generalized Gr\"otzsch ring function and generalized Hersch-Pfluger distortion function. In the past few years, the functions μa(r) and Ka(r), and their special cases μ1/2(r) and K1/2(r) have been playing the very important role on the theory of quasiconformal mappings and (generalized) Ramanujan's modular equations. In this paper, we present a series expansion of μa(r), and thus prove that the function r -[μa(r)-(eR(a)/2)/r] is absolutely monotonic on (0,1). Here R(a) is the Ramanujan constant. In addition, we also investigate the submultiplicative and power submultiplicative properties of Ka(r), and establish some new inequalities for Ka(r) in terms of elementary functions.