Occupation densities for SPDEs with reflection

• Lorenzo Zambotti ^[1]
  1. [1] Bielefeld University

     Bielefeld University

     Kreisfreie Stadt Bielefeld, Alemania

     
• Localización: Annals of probability: An official journal of the Institute of Mathematical Statistics, ISSN 0091-1798, Vol. 32, Nº. 1, 1, 2004, págs. 191-215
• Idioma: inglés
• DOI: 10.1214/aop/1078415833
• Texto completo no disponible (Saber más ...)
• Resumen

  • We consider the solution (u,η) of the white-noise driven stochastic partial differential equation with reflection on the space interval [0,1] introduced by Nualart and Pardoux, where η is a reflecting measure on [0,∞)×(0,1) which forces the continuous function u, defined on [0,∞)×[0,1], to remain nonnegative and η has support in the set of zeros of u. First, we prove that at any fixed time t>0, the measure η([0,t]×dθ) is absolutely continuous w.r.t. the Lebesgue measure dθ on (0,1). We characterize the density as a family of additive functionals of u, and we interpret it as a renormalized local time at 0 of (u(t,θ))t≥0. Finally, we study the behavior of η at the boundary of [0,1]. The main technical novelty is a projection principle from the Dirichlet space of a Gaussian process, vector-valued solution of a linear SPDE, to the Dirichlet space of the process u.