Non-divergence Parabolic Equations of Second Order with Critical Drift in Morrey Spaces

Abstract

We consider uniformly parabolic equations and inequalities of second order in the non-divergence form with drift \[-ut+Lu=-ut+ΣijaijDiju+Σ biDiu=0\,(≥0,\,≤0)\] in some domain ⊂ Rn+1. We prove a variant of Aleksandrov-Bakelman-Pucci-Krylov-Tso estimate with Lp norm of the inhomogeneous term for some number p<n+1. Based on it, we derive the growth theorems and the interior Harnack inequality. In this paper, we will only assume the drift b is in certain Morrey spaces defined below which are critical under the parabolic scaling but not necessarily to be bounded. This is a continuation of the work in GC.