State-of-the-art Graphics Processing Unit (GPU) has superior performances on float-pointing calculation and memory bandwidth, and therefore has great potential in many computationally intensive power system applications, one of which is the inversion of large-scale sparse matrix. It is a fundamental component for many power system analyses which requires to solve massive number of forward and backward substitution (F&B) subtasks and seems to be a good GPU-accelerated candidate application. By means of solving multiple F&B subtasks concurrently and a serial of performance tunings in compliance with GPU\u27s architectures, we successfully develop a batch F&B algorithm on GPUs, which not only extracts the intra-level and intra-level parallelis...
This paper accelerates a scalable GF(p) Montgomery inversion hardware. The hardware is made of two p...
none4Dense matrix inversion is a basic procedure in many linear algebra algorithms. A com...
The challenging task of analyzing on-chip power (ground) distribution networks with multimillion nod...
Parallelizing the LU factorization of sparse Jacobian matrices reduces the execution time of the pow...
In many power system applications, such as N-x static security analysis and Monte-Carlo-simulation-b...
Solution for network equations is frequently encountered by power system researchers. With the incre...
Leveraging the power of nowadays graphics processing units for robust power grid simulation remains ...
A coarse-grain parallel implementation is presented of LU factorisation, forward and backward substi...
Accelerating numerical algorithms for solving sparse linear systems on parallel architectures has at...
International audienceNowadays, several industrial applications are being ported to parallel archite...
In this paper, we tackle the inversion of large-scale dense matrices via conventional matrix factori...
For many finite element problems, when represented as sparse matrices, iterative solvers are found t...
Graphics processing unit (GPU) has been applied successfully in many scientific computing realms due...
Research is on-going that examines parallel direct block-diagonal-bordered sparse linear solvers for...
© 2019, Pleiades Publishing, Ltd. Practical applicability of many statistical algorithms is limited ...
This paper accelerates a scalable GF(p) Montgomery inversion hardware. The hardware is made of two p...
none4Dense matrix inversion is a basic procedure in many linear algebra algorithms. A com...
The challenging task of analyzing on-chip power (ground) distribution networks with multimillion nod...
Parallelizing the LU factorization of sparse Jacobian matrices reduces the execution time of the pow...
In many power system applications, such as N-x static security analysis and Monte-Carlo-simulation-b...
Solution for network equations is frequently encountered by power system researchers. With the incre...
Leveraging the power of nowadays graphics processing units for robust power grid simulation remains ...
A coarse-grain parallel implementation is presented of LU factorisation, forward and backward substi...
Accelerating numerical algorithms for solving sparse linear systems on parallel architectures has at...
International audienceNowadays, several industrial applications are being ported to parallel archite...
In this paper, we tackle the inversion of large-scale dense matrices via conventional matrix factori...
For many finite element problems, when represented as sparse matrices, iterative solvers are found t...
Graphics processing unit (GPU) has been applied successfully in many scientific computing realms due...
Research is on-going that examines parallel direct block-diagonal-bordered sparse linear solvers for...
© 2019, Pleiades Publishing, Ltd. Practical applicability of many statistical algorithms is limited ...
This paper accelerates a scalable GF(p) Montgomery inversion hardware. The hardware is made of two p...
none4Dense matrix inversion is a basic procedure in many linear algebra algorithms. A com...
The challenging task of analyzing on-chip power (ground) distribution networks with multimillion nod...