An existence result and evolutionary -convergence for perturbed gradient systems

Abstract

The initial-value problem for the perturbed gradient flow \[ B(t,u(t)) ∈ ∂u(t)(u'(t))+∂ Et(u(t)) for a.a. t∈ (0,T), u(0)=u0 \] with a perturbation B in a Banach space V is investigated, where the dissipation potential u: V→ [0,+∞) and the energy functional Et:V→ (-∞,+∞] are nonsmooth and supposed to be convex and nonconvex, respectively. The perturbation B:[0,T]× V → V*, (t,v) B(t,v) is assumed to be continuous and satisfies a growth condition. Under additional assumptions on the dissipation potential and the energy functional, existence of strong solutions is shown by proving convergence of a semi-implicit discretization scheme with a variational approximation technique.