The orthogonal complements of H1(R) in its regular Dirichlet extensions

Abstract

Consider the regular Dirichlet extension (E,F) for one-dimensional Brownian motion, that H1(R) is a subspace of F and E(f,g)=12D(f,g) for f,g∈ H1(R). Both H1(R) and F are Hilbert spaces under Eα and hence there is α-orthogonal compliment Gα. We give the explicit expression for functions in Gα which then can be described by another two spaces. On the two spaces, there is a natural Dirichlet form in the wide sense and by the darning method, their regular representations are given.