Nonlinear evolution equations with exponentially decaying memory: Existence via time discretisation, uniqueness, and stability

Abstract

The initial value problem for an evolution equation of type v' + Av + BKv = f is studied, where A:VA VA' is a monotone, coercive operator and where B:VB VB' induces an inner product. The Banach space VA is not required to be embedded in VB or vice versa. The operator K incorporates a Volterra integral operator in time of convolution type with an exponentially decaying kernel. Existence of a global-in-time solution is shown by proving convergence of a suitable time discretisation. Moreover, uniqueness as well as stability results are proved. Appropriate integration-by-parts formulae are a key ingredient for the analysis.