Method of calculation of space charge field of the beam using an expansion of space charge potential and space charge distribution as Fourier-Bessel series is discussed. Coefficients of series are connected by an algebraic equation, which substantially simplifies solution of the problem. Efficiency and accuracy of the method are discussed. Suggested method is effective in multidimensional problems of study of intense charged-particle beams.
Precise and fast 3D space charge calculations for bunches of charged particles are of growing import...
The Poisson equation is a very important partial differential equation for many branches of science...
Self-consistent multi-particle simulation plays an important role in studying beam-beam effects and ...
Method of calculation of space charge field of the beam using an expansion of space charge potential...
Design of particle accelerators with intense beams requires careful control of space charge problem....
A method is presented for calculating space-charge forces on individual particles in a particle trac...
In this paper, we present a three-dimensional Poisson equation solver for the electrostatic potentia...
In this paper, we present a three-dimensional Poisson equation solver for the electrostatic potenti...
A three-dimensional (3D) Poisson solver with longitudinal periodic and transverse open boundary cond...
We solve Poisson's equation in d=2,3 space dimensions by using a spectral method based on Fourie...
Space-charge effects play an important role in high intensity accelerators. These effects can be stu...
The design optimization and analysis of charged particle beam systems employing intense beams requir...
A method for calculating 3-D space-charge forces has been developed that is suitable for bunched bea...
Abstract In typical numerical simulations, the space-charge force is calculated by slicing a beam in...
Three-dimensional (3D) Poisson solver plays an important role in the study of space-charge effects o...
Precise and fast 3D space charge calculations for bunches of charged particles are of growing import...
The Poisson equation is a very important partial differential equation for many branches of science...
Self-consistent multi-particle simulation plays an important role in studying beam-beam effects and ...
Method of calculation of space charge field of the beam using an expansion of space charge potential...
Design of particle accelerators with intense beams requires careful control of space charge problem....
A method is presented for calculating space-charge forces on individual particles in a particle trac...
In this paper, we present a three-dimensional Poisson equation solver for the electrostatic potentia...
In this paper, we present a three-dimensional Poisson equation solver for the electrostatic potenti...
A three-dimensional (3D) Poisson solver with longitudinal periodic and transverse open boundary cond...
We solve Poisson's equation in d=2,3 space dimensions by using a spectral method based on Fourie...
Space-charge effects play an important role in high intensity accelerators. These effects can be stu...
The design optimization and analysis of charged particle beam systems employing intense beams requir...
A method for calculating 3-D space-charge forces has been developed that is suitable for bunched bea...
Abstract In typical numerical simulations, the space-charge force is calculated by slicing a beam in...
Three-dimensional (3D) Poisson solver plays an important role in the study of space-charge effects o...
Precise and fast 3D space charge calculations for bunches of charged particles are of growing import...
The Poisson equation is a very important partial differential equation for many branches of science...
Self-consistent multi-particle simulation plays an important role in studying beam-beam effects and ...