Markov uniqueness of degenerate elliptic operators

Abstract

Let be an open subset of d and H=-Σdi,j=1∂i cij ∂j a second-order partial differential operator on L2() with domain Cc∞() where the coefficients cij∈ W1,∞() are real symmetric and C=(cij) is a strictly positive-definite matrix over . In particular, H is locally strongly elliptic. We analyze the submarkovian extensions of H, i.e. the self-adjoint extensions which generate submarkovian semigroups. Our main result establishes that H is Markov unique, i.e. it has a unique submarkovian extension, if and only if (∂)=0 where (∂) is the capacity of the boundary of measured with respect to H. The second main result establishes that Markov uniqueness of H is equivalent to the semigroup generated by the Friedrichs extension of H being conservative.