Reaction-diffusion equations with transport noise and critical superlinear diffusion: Global well-posedness of weakly dissipative systems

Abstract

In this paper, we investigate the global well-posedness of reaction-diffusion systems with transport noise on the d-dimensional torus. We show new global well-posedness results for a large class of scalar equations (e.g. the Allen-Cahn equation), and dissipative systems (e.g. equations in coagulation dynamics). Moreover, we prove global well-posedness for two weakly dissipative systems: Lotka-Volterra equations for d∈\1, 2, 3, 4\ and the Brusselator for d∈ \1, 2, 3\. Many of the results are also new without transport noise. The proofs are based on maximal regularity techniques, positivity results, and sharp blow-up criteria developed in our recent works, combined with energy estimates based on It\o's formula and stochastic Gronwall inequalities. Key novelties include the introduction of new Lζ-coercivity/dissipativity conditions and the development of an Lp(Lq)-framework for systems of reaction-diffusion equations, which are needed when treating dimensions d∈ \2, 3\ in the case of cubic or higher order nonlinearities.