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Main Authors: Ohavi, Isaac, Martinez, Miguel
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2502.02754
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author Ohavi, Isaac
Martinez, Miguel
author_facet Ohavi, Isaac
Martinez, Miguel
contents The aim of this article is to give several results related to Walsh's spider diffusions living on a star-shaped network that have a spinning measure selected from the own local time of the motion at the vertex (cf.[17]). We prove the corresponding Itô's formula and give some global trajectory properties such as $L^1$-approximation of the local time and the Markov property. Regarding the behavior of the process at the vertex, we show that that the distribution of the process is non atomic at the junction point and we characterize the instantaneous scattering distribution along some ray with the aid of the probability coefficients of diffraction. We obtain also a Feynmann-Kac representation for linear parabolic systems posed on star-shaped networks that where introduced in [18] possessing a so-called local-time Kirchhoff's boundary condition.
format Preprint
id arxiv_https___arxiv_org_abs_2502_02754
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle On spider diffusions having a spinning measure selected from their own local time
Ohavi, Isaac
Martinez, Miguel
Probability
The aim of this article is to give several results related to Walsh's spider diffusions living on a star-shaped network that have a spinning measure selected from the own local time of the motion at the vertex (cf.[17]). We prove the corresponding Itô's formula and give some global trajectory properties such as $L^1$-approximation of the local time and the Markov property. Regarding the behavior of the process at the vertex, we show that that the distribution of the process is non atomic at the junction point and we characterize the instantaneous scattering distribution along some ray with the aid of the probability coefficients of diffraction. We obtain also a Feynmann-Kac representation for linear parabolic systems posed on star-shaped networks that where introduced in [18] possessing a so-called local-time Kirchhoff's boundary condition.
title On spider diffusions having a spinning measure selected from their own local time
topic Probability
url https://arxiv.org/abs/2502.02754