Variable exponent modulus in symmetric domains
Abstract
We develop explicit variational formulas for the -modulus of curve families in symmetric domains of , under a log-H\"older continuous exponent , where is an open set. For annuli with radial exponent and cylinders with axial exponent, spherical symmetrization and averaging over transverse variables reduce the problem to a one-dimensional variational problem. The extremal density is uniquely characterized by a pointwise Euler--Lagrange condition with a Lagrange multiplier determined by a normalization constraint, yielding explicit formulas for both the density and the modulus. We also establish a two-sided capacity--modulus duality and prove that -quasiconformal mappings distort the -modulus and capacity by controlled factors. Applications and numerical examples are included.
Cite
@article{arxiv.2603.26941,
title = {Variable exponent modulus in symmetric domains},
author = {Rahim Kargar},
journal= {arXiv preprint arXiv:2603.26941},
year = {2026}
}
Comments
25 pages