A simplification of the canonical Hamiltonian variables for the guiding center motion of a charged particle in a general toroidal field is obtained using the Lagrangian formalism of Littlejohn. 11 refs
Collective variables are introduced: coordinates and momenta, which in fact are canonical variables....
Collective variables are introduced: coordinates and momenta, which in fact are canonical variables....
a linear Hamiltonian system in R2n = fxg with the standard symplectic structure. Let x = (p1; : : : ...
The classical problem of the motion of a charged particle on a slowly varying electromagnetic field ...
The nonrelativistic guiding center motion of a charged particle in a static magnetic field is derive...
A sudy of the relationship between the trajectories of the exact and drift Hamiltonians for charged ...
A Hamiltonian formulation of the guiding-center drift in arbitrary, steady state, magnetic and elect...
Guiding center equations for particle motion in a general toroidal magnetic equilibrium configuratio...
The toroidal adiabatic invariant, can be used to describe both trapped and passing particle motion. ...
DoctoralThis note presents different descriptions of the equations of motion of a charged particle s...
A Hamiltonian treatment for the motion of a charged particle in a toroidal magnetic field is given. ...
A Hamiltonian treatment for the motion of a charged particle in a toroidal magnetic field is given. ...
The guiding center (GC) Lagrangian in Boozer coordinates for toroidally confined plasmas can be cast...
We develop a Hamiltonian formalism that can be used to study the particle dynamics near stable equil...
Collective variables are introduced: coordinates and momenta, which in fact are canonical variables....
Collective variables are introduced: coordinates and momenta, which in fact are canonical variables....
Collective variables are introduced: coordinates and momenta, which in fact are canonical variables....
a linear Hamiltonian system in R2n = fxg with the standard symplectic structure. Let x = (p1; : : : ...
The classical problem of the motion of a charged particle on a slowly varying electromagnetic field ...
The nonrelativistic guiding center motion of a charged particle in a static magnetic field is derive...
A sudy of the relationship between the trajectories of the exact and drift Hamiltonians for charged ...
A Hamiltonian formulation of the guiding-center drift in arbitrary, steady state, magnetic and elect...
Guiding center equations for particle motion in a general toroidal magnetic equilibrium configuratio...
The toroidal adiabatic invariant, can be used to describe both trapped and passing particle motion. ...
DoctoralThis note presents different descriptions of the equations of motion of a charged particle s...
A Hamiltonian treatment for the motion of a charged particle in a toroidal magnetic field is given. ...
A Hamiltonian treatment for the motion of a charged particle in a toroidal magnetic field is given. ...
The guiding center (GC) Lagrangian in Boozer coordinates for toroidally confined plasmas can be cast...
We develop a Hamiltonian formalism that can be used to study the particle dynamics near stable equil...
Collective variables are introduced: coordinates and momenta, which in fact are canonical variables....
Collective variables are introduced: coordinates and momenta, which in fact are canonical variables....
Collective variables are introduced: coordinates and momenta, which in fact are canonical variables....
a linear Hamiltonian system in R2n = fxg with the standard symplectic structure. Let x = (p1; : : : ...
DOI
Add to ORKG