In this paper we study how the use of a more continuous set of basis functions affects the cost of solving systems of linear equations resulting from a discretized Galerkin weak form. Specifically, we compare performance of linear solvers when discretizing using C0 B-splines, which span traditional finite element spaces, and Cp−1 B-splines, which represent maximum continuity. We provide theoretical estimates for the increase in cost of the matrix-vector product as well as for the construction and application of black-box preconditioners. We accompany these estimates with numerical results and study their sensitivity to various grid parameters such as element size hand polynomial order of approximation p in addition to the aforementioned con...
The multi-frontal direct solver is the state-of-the-art algorithm for the direct solution of sparse ...
Starting from a highly continuous isogeometric analysis discretization, we introduce hyperplanes tha...
There is a growing consensus that state of the art Finite Element/Finite Volume technology is and wi...
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...
We study the performance of direct solvers on linear systems of equations resulting from isogeometri...
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...
© 2014 John Wiley & Sons, Ltd.SUMMARY: We compare the computational efficiency of isogeometric Galer...
We compare isogeometric collocation with isogeometric Galerkin and standard C0 finite element method...
We compare isogeometric collocation with isogeometric Galerkin and standard C0 finite element method...
Performance of direct solvers strongly depends upon the employed discretization method. In particula...
We deal with numerical solution of the incompressible Navier–Stokes equations discretized using the ...
In finite element analysis, solving time-dependent partial differential equations with explicit time...
Isogeometric analysis (IGA) is a computational approach frequently employed nowadays to study proble...
The multi-frontal direct solver is the state-of-the-art algorithm for the direct solution of sparse ...
Starting from a highly continuous isogeometric analysis discretization, we introduce hyperplanes tha...
There is a growing consensus that state of the art Finite Element/Finite Volume technology is and wi...
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...
We study the performance of direct solvers on linear systems of equations resulting from isogeometri...
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...
© 2014 John Wiley & Sons, Ltd.SUMMARY: We compare the computational efficiency of isogeometric Galer...
We compare isogeometric collocation with isogeometric Galerkin and standard C0 finite element method...
We compare isogeometric collocation with isogeometric Galerkin and standard C0 finite element method...
Performance of direct solvers strongly depends upon the employed discretization method. In particula...
We deal with numerical solution of the incompressible Navier–Stokes equations discretized using the ...
In finite element analysis, solving time-dependent partial differential equations with explicit time...
Isogeometric analysis (IGA) is a computational approach frequently employed nowadays to study proble...
The multi-frontal direct solver is the state-of-the-art algorithm for the direct solution of sparse ...
Starting from a highly continuous isogeometric analysis discretization, we introduce hyperplanes tha...
There is a growing consensus that state of the art Finite Element/Finite Volume technology is and wi...