English

(1,p)-Sobolev spaces based on strongly local Dirichlet forms

Probability 2024-01-17 v2 Functional Analysis

Abstract

In the framework of quasi-regular strongly local Dirichlet form (E,D(E))(\mathscr{E},D(\mathscr{E})) on L2(X;m)L^2(X;\mathfrak{m}) admitting minimal E\mathscr{E}-dominant measure μ\mu, we construct a natural pp-energy functional (Ep,D(Ep))(\mathscr{E}^{\,p},D(\mathscr{E}^{\,p})) on Lp(X;m)L^p(X;\mathfrak{m}) and (1,p)(1,p)-Sobolev space (H1,p(X),H1,p)(H^{1,p}(X),\|\cdot\|_{H^{1,p}}) for p]1,+[p\in]1,+\infty[. In this paper, we establish the Clarkson type inequality for (H1,p(X),H1,p)(H^{1,p}(X),\|\cdot\|_{H^{1,p}}). As a consequence, (H1,p(X),H1,p)(H^{1,p}(X),\|\cdot\|_{H^{1,p}}) is a uniformly convex Banach space, hence it is reflexive. Based on the reflexivity of (H1,p(X),H1,p)(H^{1,p}(X),\|\cdot\|_{H^{1,p}}), we prove that (generalized) normal contraction operates on (Ep,D(Ep))(\mathscr{E}^{\,p},D(\mathscr{E}^{\,p})), which has been shown in the case of various concrete settings, but has not been proved for such general framework. Moreover, we prove that (1,p)(1,p)-capacity Cap1,p(A)<{\rm Cap}_{1,p}(A)<\infty for open set AA admits an equilibrium potential eAD(Ep)e_A\in D(\mathscr{E}^{\,p}) with 0eA10\leq e_A\leq 1 m\mathfrak{m}-a.e. and eA=1e_A=1 m)\mathfrak{m})-a.e.~on AA.

Keywords

Cite

@article{arxiv.2310.11652,
  title  = {(1,p)-Sobolev spaces based on strongly local Dirichlet forms},
  author = {Kazuhiro Kuwae},
  journal= {arXiv preprint arXiv:2310.11652},
  year   = {2024}
}
R2 v1 2026-06-28T12:53:56.148Z