Pre-Schwarzian and Schwarzian norm estimates for certain classes of analytic and harmonic mappings
Abstract
Let A denote the class of all analytic functions f in the unit disk D:=\z∈C: |z|<1\ such that f(0)=f'(0)-1=0. In this paper, we introduce a new subclass Cθ(γ) of A consisting of functions f that satisfy the relation \[ Re(eiθ(1+zf''(z)f'(z)))<(1+γ2)θ,~ z∈D,~ γ>0, ~and~|θ|<π2,\] and investigate the Schwarzian derivative and Schwarzian norm for functions f belonging to the class Cθ(γ). We establish sharp estimates for the Schwarzian norm \|Sf\| of functions f in the class Cθ(γ) and derive univalence criteria using both pre-Schwarzian and Schwarzian norm estimates. We also introduce a corresponding harmonic class HCθ(γ) consisting of mappings f = h+g with h∈Cθ(γ) and dilatation ω=g'/h'∈Aut(D). For this harmonic class, we derive bounds for both the pre-Schwarzian and Schwarzian norms, including sharp results in special cases.
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