The residue number system (RNS), due to its properties, is used in applications in which high performance computation is needed. The carry free nature, which makes the arithmetic, carry bounded as well as the paralleling facility is the reason of its capability of high speed rendering. Since carry is not propagated between the moduli in this system, the performance is only restricted by the speed of the operations in each modulus. In this paper a novel method of number representation by use of redundancy is suggested in which {rn- 2,rn-1,rn} is the reference moduli set where r=2k+1 and k =1, 2,3,.. This method achieves fast computations and conversions and makes the circuits of them much simpler
[[abstract]]To solve the conversion problem in Residue Number System (RNS) with a general moduli set...
The Residue Number System (RNS) is an unconventional system. This system is a useful tool for Digita...
This paper presents fast hardware algorithms for channel operations in the Residue Number System (RN...
The residue number system (RNS), due to its properties, is used in applications in which high perfor...
Residue Number System (RNS), which originates from the Chinese Remainder Theorem, offers a promising...
Although multiplication and addition can be very efficiently implemented in a Residue Number System ...
The residue number system (RNS) is popular in high performance computation applications because of i...
A novel technique to extend the base of a residue number system (RNS) based on the Chinese remainder...
Recent analyses demonstrate that operations in some bases of Residue Number System (RNS) exhibit hig...
A fast and accurate magnitude scaling technique in the residue number system (RNS) is proposed. This...
In the residue number system, a set of moduli which are independent of each other is given. An integ...
This paper proposes an efficient scalable Residue Number System (RNS) architecture supporting moduli...
In this paper, a new class of Hierarchical Residue Number Systems (HRNSs) is proposed, where the num...
Residue Number System is generally supposed to use co-prime moduli set. Non-coprime moduli sets are ...
AbstractA new division algorithm is presented for the residue number system (RNS). It is 5% faster a...
[[abstract]]To solve the conversion problem in Residue Number System (RNS) with a general moduli set...
The Residue Number System (RNS) is an unconventional system. This system is a useful tool for Digita...
This paper presents fast hardware algorithms for channel operations in the Residue Number System (RN...
The residue number system (RNS), due to its properties, is used in applications in which high perfor...
Residue Number System (RNS), which originates from the Chinese Remainder Theorem, offers a promising...
Although multiplication and addition can be very efficiently implemented in a Residue Number System ...
The residue number system (RNS) is popular in high performance computation applications because of i...
A novel technique to extend the base of a residue number system (RNS) based on the Chinese remainder...
Recent analyses demonstrate that operations in some bases of Residue Number System (RNS) exhibit hig...
A fast and accurate magnitude scaling technique in the residue number system (RNS) is proposed. This...
In the residue number system, a set of moduli which are independent of each other is given. An integ...
This paper proposes an efficient scalable Residue Number System (RNS) architecture supporting moduli...
In this paper, a new class of Hierarchical Residue Number Systems (HRNSs) is proposed, where the num...
Residue Number System is generally supposed to use co-prime moduli set. Non-coprime moduli sets are ...
AbstractA new division algorithm is presented for the residue number system (RNS). It is 5% faster a...
[[abstract]]To solve the conversion problem in Residue Number System (RNS) with a general moduli set...
The Residue Number System (RNS) is an unconventional system. This system is a useful tool for Digita...
This paper presents fast hardware algorithms for channel operations in the Residue Number System (RN...