Second Hankel determinant of logarithmic coefficients of inverse functions in certain classes of univalent functions

Abstract

The Hankel determinant H2,1(Ff-1/2) of logarithmic coefficients is defined as: align* H2,1(Ff-1/2):= vmatrix 1 & 2 2 & 3 vmatrix=13-22, align* where 1, 2, and 3 are the first, second and third logarithmic coefficients of inverse functions belonging to the class S of normalized univalent functions. In this article, we establish sharp inequalities |H2,1(Ff-1/2)|≤ 19/288, |H2,1(Ff-1/2)| ≤ 1/144, and |H2,1(Ff-1/2)| ≤ 1/36 for the logarithmic coefficients of inverse functions, considering starlike and convex functions, as well as functions with bounded turning of order 1/2, respectively.