Probabilistic representation of solutions to the parabolic p-Laplace equation

Abstract

This work is concerned with the probabilistic representation of solutions to the p-Laplace evolution equation ∂ u∂ t= div(|∇ u|p-2∇ u) in (0,∞)×Rd, u(0,x)=u0(x), x∈Rd. One proves that, if p≥ 4, and if u0 is a probability density with compact support and u0∈ L2, |∇ u0|∈ L∞, then u can be represented as u(t,x)dx= LX(t)(dx), where LX(t) denotes the time marginal law of X at time t with X being a probabilistically weak solution to a corresponding McKean-Vlasov stochastic differential equation. This result is based on a new second order global regularity result for the weak solutions to the parabolic p-Laplace equation.