This thesis discusses a hardware implementation of modulo that does not require a multiplication. This implementation is based on the algorithm proposed in Mark A. Will's "Mod without mod" in which the an algorithm is presented to calculate the modulus of large values using shifting and adding. This allows our implementation to be comparable in clock cycles to other implementations without the need for a multiplier's delay. This algorithm is compared with others, such as Barret reduction, Montgomery reduction, and fast modular reduction. Our implementation of this modulo algorithm is shown to be faster in many cases. This paper proposes both a hardware implementation of this algorithm as well as synthesis results in soi12s0 45nm IBM Multi-t...
Modular reduction is a crucial operation in many post-quantum cryptographic schemes, including the K...
This work studies and compares different modular multiplication algorithms with emphases on the unde...
Abstract-- In this paper, we present a versatile area-reduced scheme for modulo 2 n �1 adders and su...
Several modular multiplication algorithms have been reviewed. One modified modulo multiplication alg...
A θ(log n) algorithm for large moduli multiplication for Residue Number System (RNS) based architect...
With the current advances in VLSI technology, traditional algorithms for Residue Number System (RNS)...
This chapter compares Peter Montgomery\u27s modular multiplication method with traditional technique...
This chapter describes Peter L. Montgomery\u27s modular multiplication method and the various improv...
This paper gives the information regarding different methodology for modular multiplication with the...
A design for an expandable modular multiplication hardware is proposed. This design allows for casca...
Modular multiplication and modular reduction are the atomic constituents of most public-key cryptosy...
Residue number systems (RNS) represent numbers by their remainders modulo a set of relatively prime ...
Abstract. Encryption algorithms are designed to be difficult to break without knowledge of the secre...
This report describes the design and implementation results in FPGAs of a scalable hardware architec...
Residue number systems (RNS) represent numbers by their remainders modulo a set of relatively prime ...
Modular reduction is a crucial operation in many post-quantum cryptographic schemes, including the K...
This work studies and compares different modular multiplication algorithms with emphases on the unde...
Abstract-- In this paper, we present a versatile area-reduced scheme for modulo 2 n �1 adders and su...
Several modular multiplication algorithms have been reviewed. One modified modulo multiplication alg...
A θ(log n) algorithm for large moduli multiplication for Residue Number System (RNS) based architect...
With the current advances in VLSI technology, traditional algorithms for Residue Number System (RNS)...
This chapter compares Peter Montgomery\u27s modular multiplication method with traditional technique...
This chapter describes Peter L. Montgomery\u27s modular multiplication method and the various improv...
This paper gives the information regarding different methodology for modular multiplication with the...
A design for an expandable modular multiplication hardware is proposed. This design allows for casca...
Modular multiplication and modular reduction are the atomic constituents of most public-key cryptosy...
Residue number systems (RNS) represent numbers by their remainders modulo a set of relatively prime ...
Abstract. Encryption algorithms are designed to be difficult to break without knowledge of the secre...
This report describes the design and implementation results in FPGAs of a scalable hardware architec...
Residue number systems (RNS) represent numbers by their remainders modulo a set of relatively prime ...
Modular reduction is a crucial operation in many post-quantum cryptographic schemes, including the K...
This work studies and compares different modular multiplication algorithms with emphases on the unde...
Abstract-- In this paper, we present a versatile area-reduced scheme for modulo 2 n �1 adders and su...