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Groupoids and computer arithmetic
1972 IEEE 2nd Symposium on Computer Arithmetic (ARITH), 1972Overflow detection and overflow recovery imposed no particular requirements on the structure of (X, X 1 < X 1 , f x ). In particular, if f is associative and commutative, overflow recovery is obtainable even if f x is neither associative or commutative.
Harvey L. Garner, Norman Foo, Lo Hsieh
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Biomedical Signal Processing and Control, 2020
Epilepsy, a common neurological disorder, is generally detected by electroencephalogram (EEG) signals. Visual inspection and interpretation of EEGs is a slow, time consuming process that is vulnerable to error and subjective variability.
H. Amin +2 more
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Epilepsy, a common neurological disorder, is generally detected by electroencephalogram (EEG) signals. Visual inspection and interpretation of EEGs is a slow, time consuming process that is vulnerable to error and subjective variability.
H. Amin +2 more
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Significant Digit Computer Arithmetic
IEEE Transactions on Electronic Computers, 1958N Metropolis
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Computer arithmetic for probability distribution variables
Reliability Engineering and System Safety, 2004Weiye Li, J. Hyman
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High-Performance FPGA-Based CNN Accelerator With Block-Floating-Point Arithmetic
IEEE Transactions on Very Large Scale Integration (VLSI) Systems, 2019Convolutional neural networks (CNNs) are widely used and have achieved great success in computer vision and speech processing applications. However, deploying the large-scale CNN model in the embedded system is subject to the constraints of computation ...
Xiaocong Lian +5 more
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A Survey of Some Recent Contributions to Computer Arithmetic
IEEE Transactions on Computers, 1976H. Garner
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Mathematical Foundation of Computer Arithmetic
IEEE Transactions on Computers, 1975During recent years a number of papers concerning a mathematical foundation of computer arithmetic have been written. Some of these papers are still unpublished. The papers consider the spaces which occur in numerical computations on computers depending on a properly defined computer arithmetic. The following treatment gives a summary of the main ideas
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Computer Representation and Arithmetic
1995In Chapter 2, we looked at how numbers can be represented in the binary number system. In this chapter, we shall use the techniques we developed in Chapter 2 to investigate the ways in which numbers are represented and manipulated in binary form in a computer.
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On the Use of Residue Arithmetic for Computation
IEEE Transactions on Computers, 1974Residue arithmetic offers the possibility of "carryfree" arithmetic as far as the operations of addition, subtraction, and multiplication are concerned. It is faster to implement these operations using residue arithmetic as compared to implementation using binary arithmetic.
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