English

On extensions of local Dirichlet forms

Functional Analysis 2016-02-04 v1

Abstract

Let \ce\ce be a Dirichlet form on L2(X;μ)L_2(X\,;\mu) where (X,μ)(X,\mu) is locally compact σ\sigma-compact measure space. Assume \ce\ce is inner regular, i.e.\ regular in restriction to functions of compact support, and local in the sense that \ce(φ,ψ)=0\ce(\varphi,\psi)=0 for all φ,ψD(\ce)\varphi, \psi\in D(\ce) with φψ=0\varphi\,\psi=0. We construct two Dirichlet forms \cem\ce_m and \ceM\ce_M such that \cem\ce\ceM\ce_m\leq \ce\leq \ce_M. These forms are potentially the smallest and largest such Dirichlet forms. In particular \cem\ceM\ce_m\supseteq \ce_M, (\ceM)m=\cem(\ce_M)_m=\ce_m and (\cem)M=\ceM(\ce_m)_M=\ce_M. We analyze the family of local, inner regular, Dirichlet forms \cf\cf which extend \ce\ce and satisfy \cem\cf\ceM\ce_m\leq \cf\leq \ce_M. We prove that the latter bounds are valid if and only if \cfM=\ceM\cf_M=\ce_M, or \cfm=\cem\cf_m=\ce_m, or D(\ceM)D(\ce_M) is an order ideal of D(\cf)D(\cf). Alternatively the \cf\cf are characterized by D(\ceM)L(X)D(\ce_M)\cap L_\infty(X) being an algebraic ideal of D(\cf)L(X)D(\cf)\cap L_\infty(X). As an application we show that if \ce\ce and \cf\cf are strongly local then the Ariyoshi--Hino set-theoretic distance is the same for each of the forms \ce\ce, \ceM\ce_M and \cf\cf. If in addition \cem\ce_m is strongly local then it also defines the same distance. Finally we characterize the uniqueness condition \ceM=\cem\ce_M=\ce_m by capacity estimates.

Cite

@article{arxiv.1602.01167,
  title  = {On extensions of local Dirichlet forms},
  author = {Derek W. Robinson},
  journal= {arXiv preprint arXiv:1602.01167},
  year   = {2016}
}
R2 v1 2026-06-22T12:42:29.146Z