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Main Authors: Upadhyay, Sarvesh K., Sandev, Trifce, Kumar, Sanjay, Singh, R. K.
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2604.20829
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author Upadhyay, Sarvesh K.
Sandev, Trifce
Kumar, Sanjay
Singh, R. K.
author_facet Upadhyay, Sarvesh K.
Sandev, Trifce
Kumar, Sanjay
Singh, R. K.
contents We study exploration properties of a random walk on a network. For a fully connected network we find that the problem can be mapped to the well known coupon collector problem, thus allowing us to estimate form of $P(S,t)$: the distribution of number of distinct nodes $S$ visited by the random walk upto time $t$. From a practical point of view, however, both the fully connected network and hops taking place after fixed intervals are an idealization. We solve this problem by introducing the formalism of continuous time random walks wherein the random walk spends a random amount of time a node before hopping to its neighboring node. The formalism allows us to study the large deviation limit of $P(S,t)$ under very mild conditions that the distribution of waiting times $ψ(τ)$ exhibits analyticity at small times. Furthermore, we find that at small times, the properties of $P(S,t)$ are largely independent of the network topology, and are governed solely by the waiting time characteristics.
format Preprint
id arxiv_https___arxiv_org_abs_2604_20829
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Network exploration by random walks: A large deviation perspective
Upadhyay, Sarvesh K.
Sandev, Trifce
Kumar, Sanjay
Singh, R. K.
Physics and Society
We study exploration properties of a random walk on a network. For a fully connected network we find that the problem can be mapped to the well known coupon collector problem, thus allowing us to estimate form of $P(S,t)$: the distribution of number of distinct nodes $S$ visited by the random walk upto time $t$. From a practical point of view, however, both the fully connected network and hops taking place after fixed intervals are an idealization. We solve this problem by introducing the formalism of continuous time random walks wherein the random walk spends a random amount of time a node before hopping to its neighboring node. The formalism allows us to study the large deviation limit of $P(S,t)$ under very mild conditions that the distribution of waiting times $ψ(τ)$ exhibits analyticity at small times. Furthermore, we find that at small times, the properties of $P(S,t)$ are largely independent of the network topology, and are governed solely by the waiting time characteristics.
title Network exploration by random walks: A large deviation perspective
topic Physics and Society
url https://arxiv.org/abs/2604.20829