Inequivalence of nonequilibrium path ensembles: the example of stochastic bridges
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Publication:3302174
DOI10.1088/1742-5468/2015/12/P12008zbMath1456.82695arXiv1508.04969OpenAlexW1864277402WikidataQ64457211 ScholiaQ64457211MaRDI QIDQ3302174
M. R. Evans, Juraj Szavits-Nossan
Publication date: 11 August 2020
Published in: Journal of Statistical Mechanics: Theory and Experiment (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1508.04969
Related Items (14)
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Cites Work
- Unnamed Item
- Conditional distribution of heavy tailed random variables on large deviations of their sum
- Equivalence and nonequivalence of ensembles: thermodynamic, macrostate, and measure levels
- Thermodynamic formalism for systems with Markov dynamics
- Time reversal of diffusions
- The fluctuation theorem as a Gibbs property
- A Gallavotti-Cohen-type symmetry in the large deviation functional for stochastic dynamics
- Realized power variation and stochastic volatility models
- Condensation in the zero range process: stationary and dynamical properties
- Integration by parts and time reversal for diffusion processes
- Finite size effects and metastability in zero-range condensation
- Simple simulation of diffusion bridges with application to likelihood inference for diffusions
- Canonical analysis of condensation in factorised steady states
- Brownian motion with dry friction
- Two singular diffusion problems
- Probability of second law violations in shearing steady states
- A Theory of the Term Structure of Interest Rates
- Condensation transition in joint large deviations of linear statistics
- Nonequilibrium statistical mechanics of the zero-range process and related models
- Brownian motion with dry friction: Fokker–Planck approach
- Large Deviations and Ensembles of Trajectories in Stochastic Models
- Conditional brownian motion and the boundary limits of harmonic functions
- First-order dynamical phase transition in models of glasses: an approach based on ensembles of histories
- Fluctuation theorem for stochastic dynamics
- Fluctuation theorems for stochastic dynamics
- Euler scheme for SDEs with non-Lipschitz diffusion coefficient: strong convergence
- Integral Limit Theorems Taking Large Deviations into Account when Cramér’s Condition Does Not Hold. I
- Large deviation principles and complete equivalence and nonequivalence results for pure and mixed ensembles
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