Feller evolution families and parabolic equations with form-bounded vector fields

Abstract

We show that the weak solutions of parabolic equation ∂t u - u + b(t,x) · ∇ u=0, (t,x) ∈ (0,∞) × Rd, d ≥slant 3, for b(t,x) in a wide class of time-dependent vector fields capturing critical order singularities, constitute a Feller evolution family and, thus, determine a Feller process. Our proof uses an a priori estimate on the Lp-norm of the gradient of solution in terms of the Lq-norm of the gradient of initial function, and an iterative procedure that moves the problem of convergence in L∞ to Lp.