Regularity of solutions of abstract linear evolution equations

Abstract

In this paper, we study regularity of solutions to linear evolution equations of the form dX+AXdt=F(t)dt in a Banach space H, where A is a sectorial operator in H and A-α F \, (α>0) belongs to a weighted H\"older continuous function space. Similar results are obtained for linear evolution equations with additive noise of the form dX+AXdt=F(t)dt+G(t)dW(t) in a separable Hilbert space H, where W(t) is a cylindrical Wiener process. Our results are applied to a model arising in neurophysiology, which has been proposed by Walsh Walsh.