On extensions of local Dirichlet forms

Abstract

Let be a Dirichlet form on L2(X\,;μ) where (X,μ) is locally compact σ-compact measure space. Assume is inner regular, i.e.\ regular in restriction to functions of compact support, and local in the sense that (,)=0 for all , ∈ D() with \,=0. We construct two Dirichlet forms m and M such that m≤ ≤ M. These forms are potentially the smallest and largest such Dirichlet forms. In particular m⊃eq M, (M)m=m and (m)M=M. We analyze the family of local, inner regular, Dirichlet forms which extend and satisfy m≤ ≤ M. We prove that the latter bounds are valid if and only if M=M, or m=m, or D(M) is an order ideal of D(). Alternatively the are characterized by D(M) L∞(X) being an algebraic ideal of D() L∞(X). As an application we show that if and are strongly local then the Ariyoshi--Hino set-theoretic distance is the same for each of the forms , M and . If in addition m is strongly local then it also defines the same distance. Finally we characterize the uniqueness condition M=m by capacity estimates.