Isfahan University of Technology,
The Physics Society of IranIranian Journal of Physics Research1682-695723120230522The effects of random reset on the dynamics of a non-Markovian random walkThe effects of random reset on the dynamics of a non-Markovian random walk99104337010.47176/ijpr.23.1.21612FAFarhad Jafarpour HamadaniPhysics department, Bu-Ali Sina University, Hamedan, Iran0000-0003-0477-9990Hamid Vazini HekmatPhysics department, Bu-Ali Sina University, Hamedan, IranJournal Article20221202Resetting in stochastic systems is defined in different ways. In this research, a 1D non-Markovian random walk is considered. In this process, the reset changes the dynamics in a way where the random walker, after losing its memory, goes back to a fixed point in space and starts again. In this study we investigate time evolution and also the long-time limit of displacement moments in the presence of resetting. Our calculations in the long-time limit show that the probability distribution function for displacement reaches a steady-state. On the other hand, this distribution never gets to a Gaussian form for any values of the resetting rate. We will show that, in contrast to the case where the process does not undergo resetting, the moments accumulate to finite values. This is confirmed by doing Monte Carlo simulations.Resetting in stochastic systems is defined in different ways. In this research, a 1D non-Markovian random walk is considered. In this process, the reset changes the dynamics in a way where the random walker, after losing its memory, goes back to a fixed point in space and starts again. In this study we investigate time evolution and also the long-time limit of displacement moments in the presence of resetting. Our calculations in the long-time limit show that the probability distribution function for displacement reaches a steady-state. On the other hand, this distribution never gets to a Gaussian form for any values of the resetting rate. We will show that, in contrast to the case where the process does not undergo resetting, the moments accumulate to finite values. This is confirmed by doing Monte Carlo simulations.https://ijpr.iut.ac.ir/article_3370_e4a99860695fe7790bffaa6ce995e243.pdf