On penalisation results related with a remarkable class of submartingales

Abstract

Is this paper we study penalisations of diffusions satisfying some technical conditions, generalizing a result obtained by Najnudel, Roynette and Yor. If one of these diffusions has probability distribution P, then our result can be described as follows: for a large class of families of probability measures (Qt)t ≥ 0, each of them being absolutely continuous with respect to P, there exists a probability Q∞ such that for all events depending only on the canonical trajectory up to a fixed time, Qt () tends to Q∞ () when t goes to infinity. In the cases we study here, the limit measure Q∞ is absolutely continous with respect to a sigma-finite measure Q, which does not depend on the choice of the family of probabilities (Qt)t ≥ 0, but only on P. The relation between P and Q is obtained in a very general framework by the authors of this paper.