Li-Yau type and Harnack estimates for systems of reaction-diffusion equations via hybrid curvature-dimension condition

Abstract

We prove Li-Yau and Harnack inequalities for systems of linear reaction-diffusion equations. By introducing an additional discrete spatial variable, the system is rewritten as a scalar diffusion equation with an operator sum. For such operators in a mixed continuous and discrete setting, we introduce the hybrid curvature-dimension condition CDhyb (,d), which is a combination of the Bakry-\'Emery condition CD(,d) and one of its discrete analogues, the condition CD (,d). We establish a hybrid tensorisation principle and prove that under CDhyb (0,d) with d<∞ a differential Harnack estimate of Li-Yau type holds, from which a Harnack inequality can be deduced by an integration argument.

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