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http://dr.iiserpune.ac.in:8080/xmlui/handle/123456789/6793
Title: | Symmetric Exclusion Process under Power-law Stochastic Resetting |
Authors: | Basu, Urna MISHRA, SEEMANT Dept. of Physics 20161094 |
Keywords: | Statistical Physics Stochastic Resetting Symmetric Exclusion Process Non-Markovian |
Issue Date: | May-2022 |
Citation: | 72 |
Abstract: | We study the behaviour of the Symmetric Exclusion Process in the presence of a non- Markovian stochastic resetting, where the system’s configuration is reset to a step-like profile at power-law waiting times with an exponent α. We find that power-law resetting leads to a rich behaviour for the diffusive and total currents, as well as the density profile. For α < 1, we show that, in the limit of large system size L → ∞, the density profile eventually becomes uniform while the average diffusive current grows sub-linearly with time t, with an exponent that lies between 1/2 and 1. For any finite L, however, the current grows ∼ t^α at late-times t ≫ L2. We develop a perturbative approach to get the distributions of the diffusive current and explain the origins of certain peculiar ‘peaks’ in them. Furthermore, we find that the average total current grows ∼√t. Using a renewal approach, we also compute the total current distributions, which turn out to be strongly non-Gaussian and bimodal for α ≃ 1/2. For α > 1, the system relaxes to an eventual non-trivial stationary density profile, which we compute exactly. In this regime, the average diffusive current grows ∼ t. The total current, on the other hand, reaches a stationary distribution with typical non-Gaussian fluctuations and a diverging average for α ≤ 3/2, while for α > 3/2 the average total current reaches a stationary value. |
URI: | http://dr.iiserpune.ac.in:8080/xmlui/handle/123456789/6793 |
Appears in Collections: | MS THESES |
Files in This Item:
File | Description | Size | Format | |
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thesisssss.pdf | MS Thesis | 2.18 MB | Adobe PDF | View/Open Request a copy |
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