This is the pre-peer reviewed version of the following article: Adaptive precision in block‐Jacobi preconditioning for iterative sparse linear system solvers, which has been published in final form at https://doi.org/10.1002/cpe.4460. This article may be used for non-commercial purposes in accordance with Wiley Terms and Conditions for Use of Self-Archived Versions.We propose an adaptive scheme to reduce communication overhead caused by data movement by selectively storing the diagonal blocks of a block‐Jacobi preconditioner in different precision formats (half, single, or double). This specialized preconditioner can then be combined with any Krylov subspace method for the solution of sparse linear systems to perform all arithmetic in doubl...
Krylov methods provide a fast and highly parallel numerical tool for the iterative solution of many ...
The Preconditioned Conjugate Gradient method is often used in numerical simulations. While being wid...
Solving large-scale systems of linear equations [] { } {}bxA = is one of the most expensive and cr...
This is the pre-peer reviewed version of the following article: Adaptive precision in block‐Jacobi p...
We propose an adaptive scheme to reduce communication overhead caused by data movement by selectivel...
© ACM, 2021. This is the author's version of the work. It is posted here by permission of ACM for yo...
Hardware trends have motivated the development of mixed precision algo-rithms in numerical linear al...
3rd International Workshop on Energy Efficient Supercomputing (E2SC '15)We formulate an implementati...
Solving large, sparse systems of linear equations plays a significant role in certain scientific com...
With the breakdown of Dennard scaling in the mid-2000s and the end of Moore's law on the horizon, th...
In this paper, we target the parallel solution of sparse linear systems via iterative Krylov subspac...
Scientific and engineering applications are dominated by linear algebra and depend on scalable solut...
It is well established that reduced precision arithmetic can be exploited to accelerate the solution...
When simulating a mechanism from science or engineering, or an industrial process, one is frequently...
The emergence of multicore architectures and highly scalable platforms motivates the development of ...
Krylov methods provide a fast and highly parallel numerical tool for the iterative solution of many ...
The Preconditioned Conjugate Gradient method is often used in numerical simulations. While being wid...
Solving large-scale systems of linear equations [] { } {}bxA = is one of the most expensive and cr...
This is the pre-peer reviewed version of the following article: Adaptive precision in block‐Jacobi p...
We propose an adaptive scheme to reduce communication overhead caused by data movement by selectivel...
© ACM, 2021. This is the author's version of the work. It is posted here by permission of ACM for yo...
Hardware trends have motivated the development of mixed precision algo-rithms in numerical linear al...
3rd International Workshop on Energy Efficient Supercomputing (E2SC '15)We formulate an implementati...
Solving large, sparse systems of linear equations plays a significant role in certain scientific com...
With the breakdown of Dennard scaling in the mid-2000s and the end of Moore's law on the horizon, th...
In this paper, we target the parallel solution of sparse linear systems via iterative Krylov subspac...
Scientific and engineering applications are dominated by linear algebra and depend on scalable solut...
It is well established that reduced precision arithmetic can be exploited to accelerate the solution...
When simulating a mechanism from science or engineering, or an industrial process, one is frequently...
The emergence of multicore architectures and highly scalable platforms motivates the development of ...
Krylov methods provide a fast and highly parallel numerical tool for the iterative solution of many ...
The Preconditioned Conjugate Gradient method is often used in numerical simulations. While being wid...
Solving large-scale systems of linear equations [] { } {}bxA = is one of the most expensive and cr...