Nonlinear Dirichlet forms associated with quasiregular mappings
Abstract
If is a symmetric, regular, strongly local Dirichlet form on , admitting a carr\'{e} du champ operator , and is a real number, then one can define a nonlinear form by the formula where , belong to an appropriate subspace of the domain . We show that is a nonlinear Dirichlet form in the sense introduced by P. van Beusekom. We then construct the associated Choquet capacity. As a particular case we obtain the nonlinear form associated with the -Laplace operator on . Using the above procedure, for each -dimensional quasiregular mapping we construct a nonlinear Dirichlet form () such that the components of become harmonic functions with respect to . Finally, we obtain Caccioppoli type inequalities in the intrinsic metric induced by , for harmonic functions with respect to the form .
Cite
@article{arxiv.2311.01585,
title = {Nonlinear Dirichlet forms associated with quasiregular mappings},
author = {Camelia Beznea and Lucian Beznea and Michael Roeckner},
journal= {arXiv preprint arXiv:2311.01585},
year = {2023}
}