ICTS:31625

Video URL

Classical fractons: hamiltonian attractors, non-equilibrium steady states and an arrow of time

Classical fractons: hamiltonian attractors, non-equilibrium steady states and an arrow of time

(2025). Classical fractons: hamiltonian attractors, non-equilibrium steady states and an arrow of time. SciVideos. https://youtube.com/live/X6r_xiLyRj0

Classical fractons: hamiltonian attractors, non-equilibrium steady states and an arrow of time. SciVideos, Apr. 23, 2025, https://youtube.com/live/X6r_xiLyRj0 

          @misc{ scivideos_ICTS:31625,
            doi = {},
            url = {https://youtube.com/live/X6r_xiLyRj0},
            author = {},
            keywords = {},
            language = {en},
            title = {Classical fractons: hamiltonian attractors, non-equilibrium steady states and an arrow of time},
            publisher = {},
            year = {2025},
            month = {apr},
            note = {ICTS:31625 see, \url{https://scivideos.org/index.php/icts-tifr/31625}}
          }
Abhishodh Prakash
Talk numberICTS:31625
Source RepositoryICTS-TIFR
Collection

Abstract

I will summarize some recent results on systems of dipole-conserving point particles, 'fractons'. These exhibit non-equilibrium dynamics characterized by attractors, that cannot be characterized by Gibbsean statistical mechanics. Fracton dynamics generically possess a 'Janus pont' of low complexity around which a bidirectional arrow of time naturally obtains. Its Boltzmann entropy is unbounded and thus the dynamics evades 'heat death' at late times, suggesting a surprisingly clean resolution of the arrow-of-time paradox in non-equilibrium dynamics.