Several recent works have used coding-theoretic ideas for mitigating the effect of stragglers in distributed matrix computations (matrix-vector and matrix-matrix multiplication) over the reals. In particular, a polynomial code based approach distributes matrix-matrix multiplication among n worker nodes by means of polynomial evaluations. This allows for an ``optimal\u27\u27 recovery threshold whereby the intended result can be decoded as long as at least (n−s) worker nodes complete their tasks; s is the number of stragglers that the scheme can handle. However, a major issue with these approaches is the high condition number of the corresponding Vandermonde-structured recovery matrices. This presents serious numerical precision issues when d...
We present a new class of sparse and easily invertible circulant matrices that can have a sparse inv...
Coded computation techniques provide robustness against straggling workers in distributed computing....
It is well known that -circulant matrices with ≠0 can be simultaneously diagonalized by a transform ...
Several recent works have used coding-theoretic ideas for mitigating the effect of stragglers in dis...
Large matrix multiplications commonly take place in large-scale machine-learning applications. Often...
Matrix multiplication is a fundamental building block in many machine learning models. As the input ...
In this paper, due to the important value in practical applications, we consider the coded distribut...
Polynomial coding has been proposed as a solution to the straggler mitigation problem in distributed...
Coded distributed computing is an effective framework to improve the speed of distributed computing ...
Polynomial coding has been proposed as a solution to the straggler mitigation problem in distributed...
Coded computing is an effective technique to mitigate “stragglers” in large-scale and distributed ma...
Coded distributed computing is an effective framework to improve the speed of distributed computing ...
Distributed matrix computations (matrix-vector and matrix-matrix multiplications) are at the heart o...
Coded computation is an emerging research area that leverages concepts from erasure coding to mitiga...
Distributed matrix multiplication is widely used in several scientific domains. It is well recognize...
We present a new class of sparse and easily invertible circulant matrices that can have a sparse inv...
Coded computation techniques provide robustness against straggling workers in distributed computing....
It is well known that -circulant matrices with ≠0 can be simultaneously diagonalized by a transform ...
Several recent works have used coding-theoretic ideas for mitigating the effect of stragglers in dis...
Large matrix multiplications commonly take place in large-scale machine-learning applications. Often...
Matrix multiplication is a fundamental building block in many machine learning models. As the input ...
In this paper, due to the important value in practical applications, we consider the coded distribut...
Polynomial coding has been proposed as a solution to the straggler mitigation problem in distributed...
Coded distributed computing is an effective framework to improve the speed of distributed computing ...
Polynomial coding has been proposed as a solution to the straggler mitigation problem in distributed...
Coded computing is an effective technique to mitigate “stragglers” in large-scale and distributed ma...
Coded distributed computing is an effective framework to improve the speed of distributed computing ...
Distributed matrix computations (matrix-vector and matrix-matrix multiplications) are at the heart o...
Coded computation is an emerging research area that leverages concepts from erasure coding to mitiga...
Distributed matrix multiplication is widely used in several scientific domains. It is well recognize...
We present a new class of sparse and easily invertible circulant matrices that can have a sparse inv...
Coded computation techniques provide robustness against straggling workers in distributed computing....
It is well known that -circulant matrices with ≠0 can be simultaneously diagonalized by a transform ...