A new range reduction algorithm, called ModularRange Reduction (MRR), briefly introduced by the authors in [Daumas et al. 1994] is deeply analyzed. It is used to reduce the arguments to exponential and trigonometric function algorithms to be within the small range for which the algorithms are valid. MRR reduces the arguments quickly and accurately. A fast hardwired implementation of MRR operates in time (log(n)), where n is the number of bits of the binary input value. For example, with MRR it becomes possible to compute the sine and cosine of a very large number accurately. Web propose two possible architectures implementing this algorithm
Modular multiplication (MM) based on the residue number system (RNS) is a widely researched area due...
Abstract — Modular reduction is a fundamental opera-tion in cryptographic systems. Most well known m...
The parameter selection of Residue Number Systems (RNS) has a great impact on its computational effi...
Abstract: A new range reduction algorithm, called Modular Range Reduction (MRR), brie y introduced b...
Range-reduction is a key point for getting accurate elementary function routines. We introduce a new...
(eng) Range reduction is a key point for getting accurate elementary function routines. We introduce...
© Springer-Verlag Berlin Heidelberg 1994. Three modular reduction algorithms for large integers are ...
In several cases, the input argument of an elementary function evaluation is given bit-serially, mos...
Range reduction is a key point for getting accurate elementary function routines. We introduce a new...
Article dans revue scientifique avec comité de lecture.International audienceIn several cases, the i...
(eng) In several cases, the input argument of an elementary function evaluation is given bit-seriall...
With the increased use of public key cryptography, faster modular multiplication has become an impor...
Using modular exponentiation as an application, we engineered on FPGA fabric and analyzed the first ...
A fast and accurate magnitude scaling technique in the residue number system (RNS) is proposed. This...
Using modular exponentiation as an application, we engineered on FPGA fabric and analyzed the first ...
Modular multiplication (MM) based on the residue number system (RNS) is a widely researched area due...
Abstract — Modular reduction is a fundamental opera-tion in cryptographic systems. Most well known m...
The parameter selection of Residue Number Systems (RNS) has a great impact on its computational effi...
Abstract: A new range reduction algorithm, called Modular Range Reduction (MRR), brie y introduced b...
Range-reduction is a key point for getting accurate elementary function routines. We introduce a new...
(eng) Range reduction is a key point for getting accurate elementary function routines. We introduce...
© Springer-Verlag Berlin Heidelberg 1994. Three modular reduction algorithms for large integers are ...
In several cases, the input argument of an elementary function evaluation is given bit-serially, mos...
Range reduction is a key point for getting accurate elementary function routines. We introduce a new...
Article dans revue scientifique avec comité de lecture.International audienceIn several cases, the i...
(eng) In several cases, the input argument of an elementary function evaluation is given bit-seriall...
With the increased use of public key cryptography, faster modular multiplication has become an impor...
Using modular exponentiation as an application, we engineered on FPGA fabric and analyzed the first ...
A fast and accurate magnitude scaling technique in the residue number system (RNS) is proposed. This...
Using modular exponentiation as an application, we engineered on FPGA fabric and analyzed the first ...
Modular multiplication (MM) based on the residue number system (RNS) is a widely researched area due...
Abstract — Modular reduction is a fundamental opera-tion in cryptographic systems. Most well known m...
The parameter selection of Residue Number Systems (RNS) has a great impact on its computational effi...