A global view of Brownian penalisations
Abstract
In this monograph, we construct and study a sigma-finite measure on continuous functions from R+ to R, strongly related to many probability measures obtained by penalisation of Brownian motion, i.e. as limits of probabilities which are absolutely continuous with respect to Wiener measure. This remarkable sigma-finite measure can be generalized in three other cases: one can start from a two-dimensional Brownian motion, from a recurrent diffusion with values in R+, and from a discrete, recurrent Markov chain.
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