Always-convex harmonic shears

TL;DR

This paper characterizes all analytic functions in the unit disk that generate harmonic shear mappings onto convex domains, including special cases like half-planes and strips, based on shear construction parameters.

Contribution

It provides a complete analytic characterization of functions producing convex harmonic shear mappings with specific shear directions.

Findings

Characterization of functions producing convex harmonic shear mappings.

Identification of shear mappings onto half-planes and strips.

Analysis of shear direction relative to boundary features.

Abstract

We determine completely the analytic functions $\varphi$ in the unit disk $\mathbb D$ such that for all (normalized) orientation-preserving harmonic mappings $f=h+\overline g$ produced by the shear construction with $h+g=\varphi$, the condition that each $f$ maps $\mathbb D$ onto a convex domain holds. As a consequence, we obtain the following more general result: for a given complex number $\eta$, with $|\eta|=1$, we characterize those holomorphic mappings $\varphi$ in $\mathbb D$ such that every harmonic function $f=h+\overline g$ as above with $h-\eta g=\varphi$ maps $\mathbb D$ onto a convex domain. The resulting functions are mappings onto a half-plane and mappings onto a strip, and the shear direction, determined by the parameter $\eta$ above, is parallel to the linear boundaries of the half-planes and strips.