We study the performance of direct solvers on linear systems of equations resulting from isogeometric analysis. The problem of choice is the canonical Laplace equation in three dimensions. From this study we conclude that for a fixed number of unknowns and polynomial degree of approximation, a higher degree of continuity k drastically increases the CPU time and RAM needed to solve the problem when using a direct solver. This paper presents numerical results detailing the phenomenon as well as a theoretical analysis that explains the underlying cause. © 2011 Elsevier B.V
We present a multi-frontal direct solver for two dimensional isogeometric finite element method simu...
We compare isogeometric collocation with isogeometric Galerkin and standard C0 finite element method...
In finite element analysis, solving time-dependent partial differential equations with explicit time...
We study the performance of direct solvers on linear systems of equations resulting from isogeometri...
We propose the use of highly continuous finite element spaces interconnected with low continuity hyp...
In this paper we study how the use of a more continuous set of basis functions affects the cost of s...
In this paper we study how the use of a more continuous set of basis functions affects the cost of s...
Abstract. In this paper we study how the use of a more continuous set of basis functions affects the...
This paper derives theoretical estimates of the computational cost for isogeometric multi-frontal di...
© 2014 John Wiley & Sons, Ltd.SUMMARY: We compare the computational efficiency of isogeometric Galer...
We study three-dimensional isogeometric analysis (IGA) and the solution of the resulting system of l...
Isogeometric analysis (IGA) is a computational approach frequently employed nowadays to study proble...
Performance of direct solvers strongly depends upon the employed discretization method. In particula...
Starting from a highly continuous isogeometric analysis discretization, we introduce hyperplanes tha...
In this paper we present computational cost estimates for parallel shared memory isogeometric multi-...
We present a multi-frontal direct solver for two dimensional isogeometric finite element method simu...
We compare isogeometric collocation with isogeometric Galerkin and standard C0 finite element method...
In finite element analysis, solving time-dependent partial differential equations with explicit time...
We study the performance of direct solvers on linear systems of equations resulting from isogeometri...
We propose the use of highly continuous finite element spaces interconnected with low continuity hyp...
In this paper we study how the use of a more continuous set of basis functions affects the cost of s...
In this paper we study how the use of a more continuous set of basis functions affects the cost of s...
Abstract. In this paper we study how the use of a more continuous set of basis functions affects the...
This paper derives theoretical estimates of the computational cost for isogeometric multi-frontal di...
© 2014 John Wiley & Sons, Ltd.SUMMARY: We compare the computational efficiency of isogeometric Galer...
We study three-dimensional isogeometric analysis (IGA) and the solution of the resulting system of l...
Isogeometric analysis (IGA) is a computational approach frequently employed nowadays to study proble...
Performance of direct solvers strongly depends upon the employed discretization method. In particula...
Starting from a highly continuous isogeometric analysis discretization, we introduce hyperplanes tha...
In this paper we present computational cost estimates for parallel shared memory isogeometric multi-...
We present a multi-frontal direct solver for two dimensional isogeometric finite element method simu...
We compare isogeometric collocation with isogeometric Galerkin and standard C0 finite element method...
In finite element analysis, solving time-dependent partial differential equations with explicit time...