Abstract
On a manifold, consider an elliptic diffusion X admitting an invariant measure μ. The goal of this paper is to introduce and investigate the first properties of stochastic domain evolutions (Dt)t∈[0,τ] which are intertwining dual processes for X (where τ is an appropriate positive stopping time before the potential emergence of singularities). They provide an extension of Pitman’s theorem, as it turns out that (μ(Dt))t∈[0,τ] is a Bessel-3 process, up to a natural time-change. When X is a Brownian motion on a Riemannian manifold, the dual domain-valued process is a stochastic modification of the mean curvature flow to which is added an isoperimetric ratio drift to prevent it from collapsing into singletons.
Replaces
Koléhè Coulibaly-Pasquier, and Laurent Miclo, “On the evolution by duality of domains on manifolds”, TSE Working Paper, n. 20-1130, August 2020.
Reference
Koléhè Coulibaly-Pasquier, and Laurent Miclo, “On the evolution by duality of domains on manifolds”, Les Mémoires de la Société Mathématique de France, n. 171, 2021, 110 pages.
See also
Published in
Les Mémoires de la Société Mathématique de France, n. 171, 2021, 110 pages