Smooth measures and capacities associated with nonlocal parabolic operators

Abstract

We consider a family \Lt,\, t∈ [0,T]\ of closed operators generated by a family of regular (non-symmetric) Dirichlet forms \(B(t),V),t∈[0,T]\ on L2(E;m). We show that a bounded (signed) measure μ on (0,T)× E is smooth, i.e. charges no set of zero parabolic capacity associated with ∂∂ t+Lt, if and only if μ is of the form μ=f· m1+g1+∂tg2 with f∈ L1((0,T)× E;dt m), g1∈ L2(0,T;V'), g2∈ L2(0,T;V). We apply this decomposition to the study of the structure of additive functionals in the Revuz correspondence with smooth measures. As a by-product, we also give some existence and uniqueness results for solutions of semilinear equations involving the operator ∂∂ t+Lt and a functional from the dual W' of the space W=\u∈ L2(0,T;V):∂t u∈ L2(0,T;V')\ on the right-hand side of the equation.