3rd International Workshop on Energy Efficient Supercomputing (E2SC '15)We formulate an implementation of a Jacobi iterative solver for sparse linear systems that iterates the distinct components of the solution with different precision in terms of mantissa length. Starting with very low accuracy, and using an inexpensive test, our technique extends the mantissa length for those component updates when and where this is required. Numerical experiments reveal that, for a solver that pursues IEEE double precision accuracy in the solution (i.e., mantissa of 52 binary digits), the precision required to reach convergence for the distinct components can differ significantly during the iteration so that, during most of this process, only a few comp...
Adapting and designing mathematical software to achieve optimum performance on the CYBER 205 is disc...
This is the pre-peer reviewed version of the following article: Energy‐aware strategies for task‐par...
With the breakdown of Dennard scaling in the mid-2000s and the end of Moore's law on the horizon, th...
In this work, we pursue the idea of radically decoupling the floating point format used for arithmet...
We propose an adaptive scheme to reduce communication overhead caused by data movement by selectivel...
This is the pre-peer reviewed version of the following article: Adaptive precision in block‐Jacobi p...
International audienceThe standard LU factorization-based solution process for linear systems can be...
It is well established that reduced precision arithmetic can be exploited to accelerate the solution...
On many current and emerging computing architectures, single-precision calculations are at least twi...
Solving large-scale systems of linear equations [] { } {}bxA = is one of the most expensive and cr...
L'accessibilité grandissante des arithmétiques à précision faible (tfloat32, fp16, bfloat16, fp8) da...
Actes del 6th Workshop on Latest Advances in Scalable Algorithms for Large-Scale Systems (ScalA '15)...
The increasing availability of very low precisions (tfloat32, fp16, bfloat16, fp8) in hardware pushe...
Hardware trends have motivated the development of mixed precision algo-rithms in numerical linear al...
We present a benchmark of iterative solvers for sparse matrices. The benchmark contains several comm...
Adapting and designing mathematical software to achieve optimum performance on the CYBER 205 is disc...
This is the pre-peer reviewed version of the following article: Energy‐aware strategies for task‐par...
With the breakdown of Dennard scaling in the mid-2000s and the end of Moore's law on the horizon, th...
In this work, we pursue the idea of radically decoupling the floating point format used for arithmet...
We propose an adaptive scheme to reduce communication overhead caused by data movement by selectivel...
This is the pre-peer reviewed version of the following article: Adaptive precision in block‐Jacobi p...
International audienceThe standard LU factorization-based solution process for linear systems can be...
It is well established that reduced precision arithmetic can be exploited to accelerate the solution...
On many current and emerging computing architectures, single-precision calculations are at least twi...
Solving large-scale systems of linear equations [] { } {}bxA = is one of the most expensive and cr...
L'accessibilité grandissante des arithmétiques à précision faible (tfloat32, fp16, bfloat16, fp8) da...
Actes del 6th Workshop on Latest Advances in Scalable Algorithms for Large-Scale Systems (ScalA '15)...
The increasing availability of very low precisions (tfloat32, fp16, bfloat16, fp8) in hardware pushe...
Hardware trends have motivated the development of mixed precision algo-rithms in numerical linear al...
We present a benchmark of iterative solvers for sparse matrices. The benchmark contains several comm...
Adapting and designing mathematical software to achieve optimum performance on the CYBER 205 is disc...
This is the pre-peer reviewed version of the following article: Energy‐aware strategies for task‐par...
With the breakdown of Dennard scaling in the mid-2000s and the end of Moore's law on the horizon, th...