Luca Scarpa, Ulisse Stefanelli
Published 2020-04-01Version 1
We prove the applicability of the Weighted Energy-Dissipation (WED) variational principle [50] to nonlinear parabolic stochastic partial differential equations in abstract form. The WED principle consists in the minimization of a parameter-dependent convex functional on entire trajectories. Its unique minimizers correspond to elliptic-in-time regularizations of the stochastic differential problem. As the regularization parameter tends to zero, solutions of the limiting problem are recovered. This in particular provides a direct approch via convex optimization to the approximation of nonlinear stochastic partial differential equations.
Gradient methods for convex minimization: better rates under weaker conditions
Proximal Activation of Smooth Functions in Splitting Algorithms for Convex Minimization
Fast dual proximal gradient algorithms with rate $O(1/k^{1.5})$ for convex minimization
![QR code for arXiv:2004.00337 [math.OC]](http://oss.arxitics.com/images/favicon.svg)