This paper presents a parallel implementation of the fast isogeometric solvers for explicit dynamics for solving non-stationary time-dependent problems. The algorithm is described in pseudo-code. We present theoretical estimates of the computational and communication complexities for a single time step of the parallel algorithm. The computational complexity is O(p^6 N/c t_comp) and communication complexity is O(N/(c^(2/3)t_comm) where p denotes the polynomial order of B-spline basis with Cp-1 global continuity, N denotes the number of elements and c is number of processors forming a cube, t_comp refers to the execution time of a single operation, and t_comm refers to the time of sending a single datum. We compare theoretical estimates with ...
The Parallel Implicit Time-integration Algorithm (PITA) is among a very limited number of time-integ...
We present a multi-frontal direct solver for two dimensional isogeometric finite element method simu...
Isogeometric Analysis (IgA) can be seen as the natural extension of the Finite Element Method (FEM) ...
This paper presents a parallel implementation of the fast isogeometric solvers for explicit dynamics...
This paper derives theoretical estimates of the computational cost for isogeometric multi-frontal di...
In this paper we present computational cost estimates for parallel shared memory isogeometric multi-...
In finite element analysis, solving time-dependent partial differential equations with explicit time...
We study three-dimensional isogeometric analysis (IGA) and the solution of the resulting system of l...
In this paper we present a fast explicit solver for solution of non-stationary problems using L2 pro...
In this paper, we derive an object-oriented parallel algorithm for three-dimensional isopycnal flow ...
We present PetIGA, a code framework to approximate the solution of partial differential equations us...
In this paper, we use the alternating direction method for isogeometric finite elements to simulate ...
In this paper we present a multi-frontal direct solver algorithm for one and two dimensional isogeom...
The objective of this work is to present a fast parallel elliptic solver that improves efficiently t...
We study the performance of direct solvers on linear systems of equations resulting from isogeometri...
The Parallel Implicit Time-integration Algorithm (PITA) is among a very limited number of time-integ...
We present a multi-frontal direct solver for two dimensional isogeometric finite element method simu...
Isogeometric Analysis (IgA) can be seen as the natural extension of the Finite Element Method (FEM) ...
This paper presents a parallel implementation of the fast isogeometric solvers for explicit dynamics...
This paper derives theoretical estimates of the computational cost for isogeometric multi-frontal di...
In this paper we present computational cost estimates for parallel shared memory isogeometric multi-...
In finite element analysis, solving time-dependent partial differential equations with explicit time...
We study three-dimensional isogeometric analysis (IGA) and the solution of the resulting system of l...
In this paper we present a fast explicit solver for solution of non-stationary problems using L2 pro...
In this paper, we derive an object-oriented parallel algorithm for three-dimensional isopycnal flow ...
We present PetIGA, a code framework to approximate the solution of partial differential equations us...
In this paper, we use the alternating direction method for isogeometric finite elements to simulate ...
In this paper we present a multi-frontal direct solver algorithm for one and two dimensional isogeom...
The objective of this work is to present a fast parallel elliptic solver that improves efficiently t...
We study the performance of direct solvers on linear systems of equations resulting from isogeometri...
The Parallel Implicit Time-integration Algorithm (PITA) is among a very limited number of time-integ...
We present a multi-frontal direct solver for two dimensional isogeometric finite element method simu...
Isogeometric Analysis (IgA) can be seen as the natural extension of the Finite Element Method (FEM) ...