On a conjecture for the fifth coefficients for the class U(λ)

Abstract

Let f be function that is analytic in the unit disk D=\z:|z|<1\, normalized such that f(0)=f'(0)-1=0, i.e., of type f(z)=z+Σn=2∞ an zn. If additionally, \[ | (zf(z))2 f'(z) -1|<λ (z∈ D), \] then f belongs to the class U(λ), 0<λ1. In this paper we prove sharp upper bound of the modulus of the fifth coefficient of f from U(λ) satisfying \[ f(z)z 1(1+z)(1+λ z), \] ("" is the usual subordination) in the case when 0.400436… λ1.