A new parallel Self Mesh-Adaptive N-body method based on approximate inverses is proposed. The scheme is a three-dimensional Cartesian-based method that solves the Poisson equation directly in physical space, using modified multipole expansion formulas for the boundary conditions. Moreover, adaptive-mesh techniques are utilized to form a class of separate smaller n-body problems that can be solved in parallel and increase the total resolution of the system. The solution method is based on multigrid method in conjunction with the symmetric factored approximate sparse inverse matrix as smoother. The design of the parallel Self Mesh-Adaptive method along with discussion on implementation issues for shared memory computer systems is presented. ...
We describe a 3-dimensional adaptive mesh refinement Poisson solver. The complete program consists o...
Abstract: This paper presents a parallel finite element algorithm based on the toolbox PHG for solv...
We present a data-parallel formulation of an adaptive version of Anderson's method for N-body partic...
A new parallel Self Mesh-Adaptive N-body method based on approximate inverses is proposed. The schem...
A hybrid parallel self mesh-adaptive N-body method based on approximate inverses and multiprojection...
We present a new multigrid scheme for solving the Poisson equation with Dirichlet boundary condition...
During the last decades, Multigrid methods have been extensively used for solving large sparse linea...
An expansion of a density field or particle distribution in basis functions that solve the Poisson e...
This is the author accepted manuscript. The final version is available from Elsevier via the DOI in ...
Current and future accelerator design requires efficient 3D space charge computations for high brigh...
We describe the design of several portable and efficient parallel implementations of adaptive N-body...
An Θ(n) parallel multigrid summation method (MG) for the N-body problem is presented. The method was...
We present an ecient and provably good partitioning and load balancing algorithm for parallel adapti...
I present a new version of the NIRVANA code capable for the simulation of multi-scale self-gravitat...
In this paper developed and realized absolutely new algorithm for solving three-dimensional Poisson ...
We describe a 3-dimensional adaptive mesh refinement Poisson solver. The complete program consists o...
Abstract: This paper presents a parallel finite element algorithm based on the toolbox PHG for solv...
We present a data-parallel formulation of an adaptive version of Anderson's method for N-body partic...
A new parallel Self Mesh-Adaptive N-body method based on approximate inverses is proposed. The schem...
A hybrid parallel self mesh-adaptive N-body method based on approximate inverses and multiprojection...
We present a new multigrid scheme for solving the Poisson equation with Dirichlet boundary condition...
During the last decades, Multigrid methods have been extensively used for solving large sparse linea...
An expansion of a density field or particle distribution in basis functions that solve the Poisson e...
This is the author accepted manuscript. The final version is available from Elsevier via the DOI in ...
Current and future accelerator design requires efficient 3D space charge computations for high brigh...
We describe the design of several portable and efficient parallel implementations of adaptive N-body...
An Θ(n) parallel multigrid summation method (MG) for the N-body problem is presented. The method was...
We present an ecient and provably good partitioning and load balancing algorithm for parallel adapti...
I present a new version of the NIRVANA code capable for the simulation of multi-scale self-gravitat...
In this paper developed and realized absolutely new algorithm for solving three-dimensional Poisson ...
We describe a 3-dimensional adaptive mesh refinement Poisson solver. The complete program consists o...
Abstract: This paper presents a parallel finite element algorithm based on the toolbox PHG for solv...
We present a data-parallel formulation of an adaptive version of Anderson's method for N-body partic...