Gradient Bounds for Solutions of Elliptic and Parabolic Equations
Abstract
Let L be a second order elliptic operator on Rd with a constant diffusion matrix and a dissipative (in a weak sense) drift b ∈ Lploc with some p>d. We assume that L possesses a Lyapunov function, but no local boundedness of b is assumed. It is known that then there exists a unique probability measure μ satisfying the equation L*μ=0 and that the closure of L in L1(μ) generates a Markov semigroup \Tt\t 0 with the resolvent \Gλ\λ > 0. We prove that, for any Lipschitzian function f∈ L1(μ) and all t,λ>0, the functions Ttf and Gλ f are Lipschitzian and |∇ Ttf(x)| ≤ Tt|∇ f|(x) and |∇ Gλ f(x)| ≤ 1λ Gλ |∇ f|(x). An analogous result is proved in the parabolic case.
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