Measure solutions to perturbed structured population models - differentiability with respect to perturbation parameter

Abstract

This paper is devoted to study measure solutions μth to perturbed nonlinear structured population models where t denotes time and h controlls the size of perturbation. We address differentiability of the map h μth. After showing that this type of results cannot be expected in the space of bounded Radon measures M(R+) equipped with the flat metric, we move to the slightly bigger spaces Z = M(R+)(C1+α)*. We prove that when α > 12, the map h μth is differentiable in Z. The proof exploits approximation scheme of a nonlinear problem from previous studies and is based on the iteration of an implicit integral equations obtained from study of the linear equation. The result shows that space Z is a promising setting for optimal control of phenomena governed by such type of models.