Weighted Energy-Dissipation principle for gradient flows in metric spaces

Abstract

This paper develops the so-called Weighted Energy-Dissipation (WED) variational approach for the analysis of gradient flows in metric spaces. This focuses on the minimization of the parameter-dependent global-in-time functional of trajectories \[ I[u] = ∫0∞ e-t/( 12 |u'|2(t) + 1φ(u(t)) ) t, \] featuring the weighted sum of energetic and dissipative terms. As the parameter is sent to~0, the minimizers u of such functionals converge, up to subsequences, to curves of maximal slope driven by the functional φ. This delivers a new and general variational approximation procedure, hence a new existence proof, for metric gradient flows. In addition, it provides a novel perspective towards relaxation.