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Random walks on networks with stochastic resetting

Alejandro P. Riascos, Denis Boyer, Paul Herringer, José L. Mateos

2020Physical review. E93 citationsDOIOpen Access PDF

Abstract

We study random walks with stochastic resetting to the initial position on arbitrary networks. We obtain the stationary probability distribution as well as the mean and global first passage times, which allow us to characterize the effect of resetting on the capacity of a random walker to reach a particular target or to explore a finite network. We apply the results to rings, Cayley trees, and random and complex networks. Our formalism holds for undirected networks and can be implemented from the spectral properties of the random walk without resetting, providing a tool to analyze the search efficiency in different structures with the small-world property or communities. In this way, we extend the study of resetting processes to the domain of networks.

Topics & Concepts

Random walkRandom walker algorithmFormalism (music)Computer scienceProperty (philosophy)Stochastic processRandom graphPosition (finance)Probability distributionMathematicsStatistical physicsTheoretical computer scienceGraphPhysicsArtFinanceEpistemologyStatisticsMusicalPhilosophyEconomicsVisual artsDiffusion and Search DynamicsComplex Network Analysis Techniques
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