THE ENERGY-DISSIPATION PRINCIPLE FOR STOCHASTIC PARABOLIC EQUATIONS

Luca Scarpa, Ulisse Stefanelli

Publications: Contribution to journalArticlePeer Reviewed

Abstract

The Energy-Dissipation Principle provides a variational tool for the analysis of parabolic evolution problems: solutions are characterized as so-called null-minimizers of a global functional on entire trajectories. This variational technique allows for applying the general results of the calculus of variations to the underlying differential problem and has been successfully applied in a variety of deterministic cases, ranging from doubly nonlinear flows to curves of maximal slope in metric spaces. The aim of this note is to extend the Energy-Dissipation Principle to stochastic parabolic evolution equations. Applications to stability and optimal control are also presented.

Original languageEnglish
Pages (from-to)429-452
Number of pages24
JournalAdvances in Mathematical Sciences and Applications
Volume30
Issue number2
Publication statusPublished - 2021

Austrian Fields of Science 2012

  • 101002 Analysis

Keywords

  • generalized Itô’s formula
  • null-minimization
  • optimal control
  • parabolic SPDE
  • stability
  • Variational principle

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