Dual symplectic classical circuits: an exactly solvable model of many-body chaos
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Publication:6600317
DOI10.21468/SCIPOSTPHYS.16.2.049MaRDI QIDQ6600317
Dmitry L. Kovrizhin, Andrea De Luca, Alexios Christopoulo, Tomaž Prosen
Publication date: 9 September 2024
Published in: SciPost Physics (Search for Journal in Brave)
Dynamical aspects of finite-dimensional Hamiltonian and Lagrangian systems (37Jxx) Time-dependent statistical mechanics (dynamic and nonequilibrium) (82Cxx) Applications of statistical mechanics to specific types of physical systems (82Dxx)
Cites Work
- Pseudo holomorphic curves in symplectic manifolds
- Kardar-Parisi-Zhang physics in integrable rotationally symmetric dynamics on discrete space-time lattice
- Nonlinear fluctuating hydrodynamics for the classical XXZ spin chain
- Random matrix spectral form factor of dual-unitary quantum circuits
- Nonlinear fluctuating hydrodynamics for anharmonic chains
- Continuous and discrete (classical) Heisenberg spin chain revised
- Broken ergodicity in classically chaotic spin systems
- Resonances of the Frobenius-Perron operator for a Hamiltonian map with a mixed phase space
- Dynamic Scaling of Growing Interfaces
- Symplectic maps, variational principles, and transport
- Dynamics of the classical Heisenberg spin chain
- Integrability and soliton in a classical one-dimensional site-dependent biquadratic Heisenberg spin chain and the effect of nonlinear inhomogeneity
- Chaos in Dynamical Systems
- ERGODIC CONDITION AND MAGNETIC MODELS
- Statistical Properties of Deterministic Systems
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