On nonlinear Miyadera-Voigt perturbations

Abstract

Let A,C,P:D(A)⊂ X X be linear operators on a Banach space X such that -A generates a strongly continuous semigroup on X, and F:X X be a globally Lipschitz function. We study the well-posedness of semilinear equations of the form u(t)=G(u(t)), where G:D(A) X is a nonlinear map defined by G=-A+C+F P. In fact, using the concept of maximal Lp-regularity and a fixed point theorem, we establish the existence and uniqueness of a strong solution for the above-mentioned semilinear equation. We illustrate our results by applications to nonlinear heat equations with respect to Dirichlet and Neumann boundary conditions, and a nonlocal unbounded nonlinear perturbation.