Thermalization in the one-dimensional Salerno model lattice

Abstract: The Salerno model constitutes an intriguing interpolation between the integrable Ablowitz-Ladik (AL) model and the more standard (non-integrable) discrete nonlinear Schrödinger (DNLS) one. The competition of local on-site nonlinearity and nonlinear dispersion governs the thermalization of this model. Here, we investigate the statistical mechanics of the Salerno one-dimensional lattice model in the nonintegrable case and illustrate the thermalization in the Gibbs regime. As the parameter interpolating between t… Show more

“…Having established these various methods, it would be interesting to adapt them to explore other interacting many body systems including non-separable Hamiltonian systems (e.g. various generalizations of DNLS [45][46][47][48], spin chains [26,41,[49][50][51] etc.). In future, we plan to understand the different dynamical regimes and the onset of chaos in such systems through the lens of a mode coupling theory [32].…”

Dynamical regimes of finite temperature discrete nonlinear Schrödinger chain

“…Having established these various methods, it would be interesting to adapt them to explore other interacting many body systems including non-separable Hamiltonian systems (e.g. various generalizations of DNLS [45][46][47][48], spin chains [26,41,[49][50][51] etc.). In future, we plan to understand the different dynamical regimes and the onset of chaos in such systems through the lens of a mode coupling theory [32].…”

Dynamical regimes of finite temperature discrete nonlinear Schrödinger chain

Exploring the Salerno Model for Rogue Wave Generation: A Linear Stability Analysis Beyond the DNLS and AL Limits

Dynamical regimes of finite-temperature discrete nonlinear Schrödinger chain