Results 261 to 270 of about 102,917 (301)

Approximate Computing: A Survey

IEEE Design and Test, 2016
As one of the most promising energy-efficient computing paradigms, approximate computing has gained a lot of research attention in the past few years. This paper presents a survey of state-of-the-art work in all aspects of approximate computing and highlights future research challenges in this field.
Qiang Xu, Todd Mytkowicz, Nam Sung Kim
exaly   +2 more sources

Approximate Computing

IEEE Micro, 2018
Natalie Enright Jerger
exaly   +2 more sources

Approximate Memristive In-memory Computing [PDF]

open access: yesTransactions on Embedded Computing Systems, 2017
The bottleneck between the processing elements and memory is the biggest issue contributing to the scalability problem in computing. In-memory computation is an alternative approach that combines memory and processor in the same location, and eliminates ...
Hasan Erdem Yantır   +2 more
exaly   +2 more sources

Test and Reliability in Approximate Computing [PDF]

open access: yesJournal of Electronic Testing: Theory and Applications (JETTA), 2018
International audienceThis paper presents an overview of test and reliability approaches for approximate computing architectures. We focus on how specific methods for test and reliability can be used to improve the characteristics of approximate ...
Lorena Anghel   +2 more
exaly   +2 more sources

Approximate Computing

2016 29th International Conference on VLSI Design and 2016 15th International Conference on Embedded Systems (VLSID), 2016
We face an urgent need for new sources of efficiency in computing due to the diminishing benefits from semiconductor technology scaling on the one hand, and the need to keep up with the explosive growth in data on the other. The very workloads that drive the demand for computing across the spectrum hold out promise for new opportunities.
Swagath Venkataramani   +2 more
openaire   +1 more source

Approximate computation of pseudovarieties

ACM SIGSAM Bulletin, 2003
Many other combinatorial properties of the size of the Dixon matrix and the structure of the Dixon polynomial of a given polynomial system are related to the support hull of the polynomial system and their projections along different dimensions. This research is supported in part by NSF grant nos.
Robert M. Corless   +2 more
openaire   +1 more source

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