Add to ORKGIn this paper we give an example of the d-dimensional integrable infinite particle Hamiltonian system, originating from the Topological Quantum Field Theory
The Vlasov system describes the dynamics of large collections of indistinguishable particles, which ...
We consider the integrable family of symmetric boundary-driven interacting particle systems that ari...
The paper surveys open problems and questions related to different aspects of integrable systems wit...
We show that a many-body Hamiltonian that corresponds to a system of fermions interacting through a ...
New integrable 1 + 1 dimensional classical field theories are found that include infinite dimensiona...
This work investigates classical interacting particle systems for which the stochastic time evolutio...
Consider a one-dimensional lattice boson system with the Hamiltonian in a finite box Λ, H_Λ = K_Λ + ...
We present an infinite-dimensional classical integrable hamiltonian system on projective Hilbert spa...
This work investigates classical interacting particle systems for which the stochastic time evolutio...
Mechanical systems (i.e., one-dimensional field theories) with constraints are the focus of this pap...
Mechanical systems (i.e., one-dimensional field theories) with constraints are the focus of this pap...
Our purpose is to give an exposition of the foundations of non-linear conservative mechanical system...
Our purpose is to give an exposition of the foundations of non-linear conservative mechanical system...
We study a charged particle in an electromagnetic field without kinetic or potential term. Although ...
Exchange operator formalism describes many-body integrable systems using phase-space variables invol...
The Vlasov system describes the dynamics of large collections of indistinguishable particles, which ...
We consider the integrable family of symmetric boundary-driven interacting particle systems that ari...
The paper surveys open problems and questions related to different aspects of integrable systems wit...
We show that a many-body Hamiltonian that corresponds to a system of fermions interacting through a ...
New integrable 1 + 1 dimensional classical field theories are found that include infinite dimensiona...
This work investigates classical interacting particle systems for which the stochastic time evolutio...
Consider a one-dimensional lattice boson system with the Hamiltonian in a finite box Λ, H_Λ = K_Λ + ...
We present an infinite-dimensional classical integrable hamiltonian system on projective Hilbert spa...
This work investigates classical interacting particle systems for which the stochastic time evolutio...
Mechanical systems (i.e., one-dimensional field theories) with constraints are the focus of this pap...
Mechanical systems (i.e., one-dimensional field theories) with constraints are the focus of this pap...
Our purpose is to give an exposition of the foundations of non-linear conservative mechanical system...
Our purpose is to give an exposition of the foundations of non-linear conservative mechanical system...
We study a charged particle in an electromagnetic field without kinetic or potential term. Although ...
Exchange operator formalism describes many-body integrable systems using phase-space variables invol...
The Vlasov system describes the dynamics of large collections of indistinguishable particles, which ...
We consider the integrable family of symmetric boundary-driven interacting particle systems that ari...
The paper surveys open problems and questions related to different aspects of integrable systems wit...