Global Regularity and Bounds for Solutions of Parabolic Equations for Probability Measures
Abstract
Given a second order parabolic operator Lu(t,x) :=∂ u(t,x)∂ t + aij(t,x)∂xi∂xju(t,x) + bi(t,x)∂xiu(t,x), we consider the weak parabolic equation L*μ=0 for Borel probability measures on (0,1)×Rd. The equation is understood as the equality ∫(0,1)×Rd Lu dμ =0 for all smooth functions u with compact support in~(0,1)×Rd. This equation is satisfied for the transition probabilities of the diffusion process associated with~L. We show that under broad assumptions μ has the form μ=(t,x) dt dx, where the function x (t,x) is Sobolev, |∇x (x,t)|2/(t,x) is Lebesgue integrable over [0,τ]×Rd, and ∈ Lp([0,τ]×Rd) for all p∈ [1,+∞) and τ<1. Moreover, a sufficient condition for the uniform boundedness of on [0,τ]×Rd is given.
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