Residue number systems (RNS) represent numbers by their remainders modulo a set of relatively prime numbers. This paper pro- poses an efficient hardware implementation of modular multiplication and of the modulo function (X(mod P )), based on Boolean minimiza- tion. We report experiments showing a performance advantage up to 30 times for our approach vs. the results obtained by state-of-art industrial tools
Several modular multiplication algorithms have been reviewed. One modified modulo multiplication alg...
Abs t rac t In this paper, we investigate residue number system (RNS) to deci-lnnl number system con...
Designing an optimal Residue Number System (RNS) processor in terms of area and speed depends on the...
Residue number systems (RNS) represent numbers by their remainders modulo a set of relatively prime ...
This paper presents fast hardware algorithms for channel operations in the Residue Number System (RN...
A θ(log n) algorithm for large moduli multiplication for Residue Number System (RNS) based architect...
Residue Number System (RNS) is a very old number system which was proposed in 1500 AD. Parallel natu...
Public-key cryptography is a mechanism for secret communication between parties who have never befor...
Residue Number System (RNS), which originates from the Chinese Remainder Theorem, offers a promising...
With the current advances in VLSI technology, traditional algorithms for Residue Number System (RNS)...
Modulo 2n + 1 arithmetic has a variety of applications in several fields like cryptography, pseudora...
A new algorithm for modular multiplication in the residue number system (RNS) is presented. Modular ...
Using modular exponentiation as an application, we engineered on FPGA fabric and analyzed the first ...
Using modular exponentiation as an application, we engineered on FPGA fabric and analyzed the first ...
In the residue number system, a set of moduli which are independent of each other is given. An integ...
Several modular multiplication algorithms have been reviewed. One modified modulo multiplication alg...
Abs t rac t In this paper, we investigate residue number system (RNS) to deci-lnnl number system con...
Designing an optimal Residue Number System (RNS) processor in terms of area and speed depends on the...
Residue number systems (RNS) represent numbers by their remainders modulo a set of relatively prime ...
This paper presents fast hardware algorithms for channel operations in the Residue Number System (RN...
A θ(log n) algorithm for large moduli multiplication for Residue Number System (RNS) based architect...
Residue Number System (RNS) is a very old number system which was proposed in 1500 AD. Parallel natu...
Public-key cryptography is a mechanism for secret communication between parties who have never befor...
Residue Number System (RNS), which originates from the Chinese Remainder Theorem, offers a promising...
With the current advances in VLSI technology, traditional algorithms for Residue Number System (RNS)...
Modulo 2n + 1 arithmetic has a variety of applications in several fields like cryptography, pseudora...
A new algorithm for modular multiplication in the residue number system (RNS) is presented. Modular ...
Using modular exponentiation as an application, we engineered on FPGA fabric and analyzed the first ...
Using modular exponentiation as an application, we engineered on FPGA fabric and analyzed the first ...
In the residue number system, a set of moduli which are independent of each other is given. An integ...
Several modular multiplication algorithms have been reviewed. One modified modulo multiplication alg...
Abs t rac t In this paper, we investigate residue number system (RNS) to deci-lnnl number system con...
Designing an optimal Residue Number System (RNS) processor in terms of area and speed depends on the...