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Main Authors: Tung, Hwai-Ray, Lawley, Sean D
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2601.08740
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author Tung, Hwai-Ray
Lawley, Sean D
author_facet Tung, Hwai-Ray
Lawley, Sean D
contents The canonical model of stochastic search tracks a randomly diffusing "searcher" until it finds a "target." Owing to its many applications across science and engineering, this perennially popular problem has been thoroughly investigated in a variety of models. However, aside from some exactly solvable one-dimensional examples, very little is known if the searcher diffusivity varies in space. For such space-dependent or "heterogeneous" diffusion, one must specify the interpretation of the multiplicative noise, which is termed the Itô-Stratonovich dilemma. In this paper, we investigate how stochastic search with space-dependent diffusivity depends on this interpretation. We obtain general formulas for the probability distribution and all the moments of the stochastic search time and the so-called splitting probabilities assuming that the targets are small or weakly reactive. These asymptotic results are valid for general space-dependent diffusivities in general domains in any space dimension with targets of general shape which may be in the interior or on the boundary of the domain. We illustrate our theory with stochastic simulations. Our analysis predicts that stochastic search can depend strongly and counterintuitively on the multiplicative noise interpretation.
format Preprint
id arxiv_https___arxiv_org_abs_2601_08740
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Stochastic search with space-dependent diffusivity
Tung, Hwai-Ray
Lawley, Sean D
Statistical Mechanics
Analysis of PDEs
Probability
60J60, 35Q84, 60H10
The canonical model of stochastic search tracks a randomly diffusing "searcher" until it finds a "target." Owing to its many applications across science and engineering, this perennially popular problem has been thoroughly investigated in a variety of models. However, aside from some exactly solvable one-dimensional examples, very little is known if the searcher diffusivity varies in space. For such space-dependent or "heterogeneous" diffusion, one must specify the interpretation of the multiplicative noise, which is termed the Itô-Stratonovich dilemma. In this paper, we investigate how stochastic search with space-dependent diffusivity depends on this interpretation. We obtain general formulas for the probability distribution and all the moments of the stochastic search time and the so-called splitting probabilities assuming that the targets are small or weakly reactive. These asymptotic results are valid for general space-dependent diffusivities in general domains in any space dimension with targets of general shape which may be in the interior or on the boundary of the domain. We illustrate our theory with stochastic simulations. Our analysis predicts that stochastic search can depend strongly and counterintuitively on the multiplicative noise interpretation.
title Stochastic search with space-dependent diffusivity
topic Statistical Mechanics
Analysis of PDEs
Probability
60J60, 35Q84, 60H10
url https://arxiv.org/abs/2601.08740