A quasi-commutativity property of the Poisson and composition operators

TL;DR

This paper investigates a specific property relating Poisson and composition operators, establishing conditions under which their associated Dirichlet integrals are equivalent, with applications to inequalities for harmonic functions.

Contribution

It provides a necessary and sufficient condition for the equivalence of Dirichlet integrals involving Poisson and composition operators, advancing understanding of their quasi-commutativity.

Findings

Derived a condition for Dirichlet integral equivalence

Established sharp inequalities for harmonic functions

Enhanced understanding of Poisson and composition operator interactions

Abstract

Let $\Phi$ be a real valued function of one real variable, let $L$ denote an elliptic second order formally self-adjoint differential operator with bounded measurable coefficients, and let $P$ stand for the Poisson operator for $L$. A necessary and sufficient condition on $\Phi ensuring the equivalence of the Dirichlet integrals of $\Phi\circ Ph$ and $P(\Phi\circ h)$ is obtained. We illustrate this result by some sharp inequalities for harmonic functions.