Existence and uniqueness results of a stochastic nonlinear heat equation with a constraint of codimension one

Abstract

In this work, we investigate the well-posedness of a stochastic heat equation with an arbitrary (but polynomial) nonlinearity in any dimension d≥ 1 perturbed by a multiplicative white noise in the Stratonovich form, subject to an L2-norm constraint on the solution. In bounded smooth domains, we establish the existence of a martingale solution taking values in H01 Lp for arbitrary 2 p < ∞, using a modified Faedo-Galerkin scheme. By utilizing a sequence of self-adjoint operators which are bounded in Lp for any 2 p < ∞, we provide a novel proof of an It\o formula for the Lp-norm of the solution. Together with pathwise uniqueness of the martingale solution, the Yamada-Watanabe result then yields the existence of a strong solution and uniqueness in law.