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Controlling particle currents with evaporation and resetting from an interval

Gennaro Tucci, Andrea Gambassi, Shamik Gupta, Édgar Roldán

2020Physical Review Research32 citationsDOIOpen Access PDF

Abstract

We investigate the Brownian diffusion of particles in one spatial dimension and in the presence of finite regions within which particles can either evaporate or be reset to a given location. For open boundary conditions, we highlight the appearance of a Brownian yet non-Gaussian diffusion: At long times, the particle distribution is non-Gaussian but its variance grows linearly in time. Moreover, we show that the effective diffusion coefficient of the particles in such systems is bounded from below by 1 -2/ times their bare diffusion coefficient. For periodic boundary conditions, i.e., for diffusion on a ring with resetting, we demonstrate a "gauge invariance" of the spatial particle distribution for different choices of the resetting probability currents, in both stationary and nonstationary regimes. Finally, we apply our findings to a stochastic biophysical model for the motion of RNA polymerases during transcriptional pauses, deriving analytically the distribution of the length of cleaved RNA transcripts and the efficiency of RNA cleavage in backtrack recovery.

Topics & Concepts

Brownian motionDiffusionParticle (ecology)Bounded functionStatistical physicsBoundary (topology)Interval (graph theory)Anomalous diffusionReset (finance)Stochastic processMathematicsEvaporationDimension (graph theory)Distribution (mathematics)PhysicsProbability distributionMathematical analysisDiffusion processParticle numberStationary distributionBoundary value problemLocal timeMechanicsStochastic modellingRotational diffusionParticle systemTracking (education)Classical mechanicsStatistical fluctuationsUpper and lower boundsKinetic energyDiffusion and Search Dynamicsstochastic dynamics and bifurcationAdvanced Thermodynamics and Statistical Mechanics
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