English

Nonlinear Dirichlet forms associated with quasiregular mappings

Analysis of PDEs 2023-11-06 v1

Abstract

If (E,D)({\cal E}, {\cal D}) is a symmetric, regular, strongly local Dirichlet form on L2(X,m)L^2 (X,m), admitting a carr\'{e} du champ operator Γ\Gamma, and p>1p>1 is a real number, then one can define a nonlinear form Ep{\cal E}^p by the formula Ep(u,v)=XΓ(u)p22Γ(u,v)dm, {\cal E}^p(u,v) = \int_{X} \Gamma(u)^\frac{p-2}{2} \Gamma(u,v)dm , where uu, vv belong to an appropriate subspace of the domain D{\cal D}. We show that Ep{\cal E}^p 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 pp-Laplace operator on W01,pW_0^{1,p}. Using the above procedure, for each nn-dimensional quasiregular mapping ff we construct a nonlinear Dirichlet form En{\cal E}^n (p=np=n) such that the components of ff become harmonic functions with respect to En{\cal E}^n. Finally, we obtain Caccioppoli type inequalities in the intrinsic metric induced by E{\cal E}, for harmonic functions with respect to the form Ep{\cal E}^p.

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}
}
R2 v1 2026-06-28T13:10:08.103Z