Contact geometric descriptions of vector fields on dually flat spaces and their applications in electric circuit models and nonequilibrium statistical mechanics

DOI10.1063/1.4964751zbMath1351.37237arXiv1512.00950OpenAlexW3100831561MaRDI QIDQ2832723

No author found.

Publication date: 14 November 2016

Published in: Journal of Mathematical Physics (Search for Journal in Brave)

Full work available at URL: https://arxiv.org/abs/1512.00950

zbMATH Keywords

contact manifold Legendre submanifold Legendre duality contact Hamiltonian vector fields

Mathematics Subject Classification ID

Special integral transforms (Legendre, Hilbert, etc.) (44A15) Technical applications of optics and electromagnetic theory (78A55) Quantum dynamics and nonequilibrium statistical mechanics (general) (82C10) Global submanifolds (53C40) Contact manifolds (general theory) (53D10) Contact systems (37J55)

Related Items (22)

Nonequilibrium thermodynamic process with hysteresis and metastable states—A contact Hamiltonian with unstable and stable segments of a Legendre submanifold ⋮ Nonautonomous k-contact field theories ⋮ Affine geometric description of thermodynamics ⋮ Inverse problem and equivalent contact systems ⋮ Skinner-Rusk formalism for \(k\)-contact systems ⋮ Scaling symmetries, contact reduction and Poincaré’s dream ⋮ Unified Lagrangian‐Hamiltonian Formalism for Contact Systems ⋮ Time-dependent contact mechanics ⋮ Lagrangian-Hamiltonian formalism for cocontact systems ⋮ A variational derivation of the field equations of an action-dependent Einstein-Hilbert Lagrangian ⋮ Contact Lie systems: theory and applications ⋮ Hamilton-Jacobi theory and integrability for autonomous and non-autonomous contact systems ⋮ Exact Baker–Campbell–Hausdorff formula for the contact Heisenberg algebra ⋮ Diffusion equations from master equations—A discrete geometric approach ⋮ Contact Hamiltonian Systems for Probability Distribution Functions and Expectation Variables: A Study Based on a Class of Master Equations ⋮ Thermodynamics and evolutionary biology through optimal control ⋮ Hessian–information geometric formulation of Hamiltonian systems and generalized Toda’s dual transform ⋮ A \(K\)-contact Lagrangian formulation for nonconservative field theories ⋮ Contact geometry and thermodynamics ⋮ Optimal control, contact dynamics and Herglotz variational problem ⋮ Constrained Lagrangian dissipative contact dynamics ⋮ Contact variational integrators

Cites Work

This page was built for publication: Contact geometric descriptions of vector fields on dually flat spaces and their applications in electric circuit models and nonequilibrium statistical mechanics