W1,p regularity of solutions to Kolmogorov equation with Gilbarg-Serrin matrix

Abstract

In Rd, d ≥ 3, consider the divergence and the non-divergence form operators equation i - - ∇ · (a-I) · ∇ + b · ∇, equation equation ii - - (a-I) · ∇2 + b · ∇, equation where the second order perturbations are given by the matrix a-I=c|x|-2x x, c>-1. The vector field b: Rd → Rd is form-bounded with the form-bound δ>0 (this includes a sub-critical class [Ld + L∞]d, as well as vector fields having critical-order singularities). We characterize quantitative dependence on c and δ of the Lq → W1,qd/(d-2) regularity of the resolvents of the operator realizations of (i), (ii) in Lq, q ≥ 2 ( d-2) as (minus) generators of positivity preserving L∞ contraction C0 semigroups.