This article reviews the role of hidden symmetries of dynamics in the study of physical systems, from the basic concepts of symmetries in phase space to the forefront of current research. Such symmetries emerge naturally in the description of physical systems as varied as nonrelativistic, relativistic, with or without gravity, classical or quantum, and are related to the existence of conserved quantities of the dynamics and integrability. In recent years their study has grown intensively, due to the discovery of nontrivial examples that apply to different types of theories and different numbers of dimensions. Applications encompass the study of integrable systems such as spinning tops, the Calogero model, systems described by the Lax equati...
In this contribution we aim to provide a very brief introduction to some of the work that has been d...
Classical dynamics is traditionally treated as an early stage in the development of physics, a stage...
The behavior of symmetries of classical equations of motion under quantization is studied from a new...
Nineteen classical superintegrable systems in two-dimensional non-Euclidean spaces are shown to poss...
Classical Mechanics consists of three parts: Newtonian, Lagrangian and Hamiltonian Mechanics, where ...
The aim of this thesis is to provide a definition of dynamical symme- try and to study its propertie...
The action of the quantum mechanical volume operator, introduced in connection with a symmetric rep...
Abstract The role of symmetries in formation of quantum dynamics is discussed. A quantum version of ...
Van Holten's covariant algorithm for deriving conserved quantities is presented, with particular att...
Abstract We review the Schwinger-Keldysh, or in-in, formalism for studying quantum dynamics of syste...
This book describes, by using elementary techniques, how some geometrical structures widely used tod...
Symmetries and Semi-invariants in the Analysis of Nonlinear Systems details the analysis of continuo...
Whenever systems are governed by continuous chains of causes and effects, their behavior exhibits th...
The role of symmetries in formation of quantum dynamics is discussed. A quantum version of the d'Ala...
We describe the role of symmetries in formation of quantum dynamics. A quantum version of d'Alembert...
In this contribution we aim to provide a very brief introduction to some of the work that has been d...
Classical dynamics is traditionally treated as an early stage in the development of physics, a stage...
The behavior of symmetries of classical equations of motion under quantization is studied from a new...
Nineteen classical superintegrable systems in two-dimensional non-Euclidean spaces are shown to poss...
Classical Mechanics consists of three parts: Newtonian, Lagrangian and Hamiltonian Mechanics, where ...
The aim of this thesis is to provide a definition of dynamical symme- try and to study its propertie...
The action of the quantum mechanical volume operator, introduced in connection with a symmetric rep...
Abstract The role of symmetries in formation of quantum dynamics is discussed. A quantum version of ...
Van Holten's covariant algorithm for deriving conserved quantities is presented, with particular att...
Abstract We review the Schwinger-Keldysh, or in-in, formalism for studying quantum dynamics of syste...
This book describes, by using elementary techniques, how some geometrical structures widely used tod...
Symmetries and Semi-invariants in the Analysis of Nonlinear Systems details the analysis of continuo...
Whenever systems are governed by continuous chains of causes and effects, their behavior exhibits th...
The role of symmetries in formation of quantum dynamics is discussed. A quantum version of the d'Ala...
We describe the role of symmetries in formation of quantum dynamics. A quantum version of d'Alembert...
In this contribution we aim to provide a very brief introduction to some of the work that has been d...
Classical dynamics is traditionally treated as an early stage in the development of physics, a stage...
The behavior of symmetries of classical equations of motion under quantization is studied from a new...