Comparison principle for stochastic heat equations driven by α-stable white noises

Abstract

For a class of non-linear stochastic heat equations driven by α-stable white noises for α∈(1,2) with Lipschitz coefficients, we first show the existence and pathwise uniqueness of Lp-valued c\`adl\`ag solutions to such a equation for p∈(α,2] by considering a sequence of approximating stochastic heat equations driven by truncated α-stable white noises obtained by removing the big jumps from the original α-stable white noises. If the α-stable white noise is spectrally one-sided, under additional monotonicity assumption on noise coefficients, we prove a comparison theorem on the L2-valued c\`adl\`ag solutions of such a equation. As a consequence, the non-negativity of the L2-valued c\`adl\`ag solution is established for the above stochastic heat equation with non-negative initial function.