Inverting Ray-Knight identities on trees

Abstract

In this paper, we first introduce the Ray-Knight identity and percolation Ray-Knight identity related to loop soup with intensity α ( 0) on trees. Then we present the inversions of the above identities, which are expressed in terms of repelling jump processes. In particular, the inversion in the case of α=0 gives the conditional law of a Markov jump process given its local time field. We further show that the fine mesh limits of these repelling jump processes are the self-repelling diffusions Aidekon involved in the inversion of the Ray-Knight identity on the corresponding metric graph. This is a generalization of results in 2016Inverting,lupu2019inverting,LupuEJP657, where the authors explore the case of α=1/2 on a general graph. Our construction is different from 2016Inverting,lupu2019inverting and based on the link between random networks and loop soups.