Strongly continuous semigroups, weak solutions, and the variation of constants formula

Abstract:

Let A be a densely defined closed linear operator on a Banach space X, and let $f \in {L^1}(0,\tau ;X)$. A definition of weak solutions of the equation $\dot u = Au + f(t)$ is given. It is shown that a necessary and sufficient condition for the existence of unique weak solutions for every initial data in X is that A generate a strongly continuous semigroup on X, and that in this case the solution is given by the variation of constants formula.