Add to ORKGFinite fields have been used for many types of Public Key Cryptography, such as Elliptic Curve (EC) and RSA Cryptosystems. This paper presents an arithmetic unit that support Galois fields GF(p) and GF(2(m)) for arbitrary prime numbers and irreducible polynomials respectively. The arithmetic unit can do the Galois field arithmetic operations of addition, subtraction, multiplication, squaring, inversion and division. The least significant bit first (LSB-first) scheme for modular multiplication and the extended Euclid's algorithm for modular inversion are both modified for the arithmetic unit. The architecture has been implemented using 0.18-mu m CMOS standard cell library, the clock frequency can reach at least 250MHz for a 256-bit arit...
This paper describes a hardware-software co-design approach for flexible programmable Galois Field P...
This paper describes a hardware implementation of an arithmetic processor which is efficient for bit...
The high performance of an elliptic curve (EC) crypto system depends efficiently on the arithmetic i...
Finite fields have been used for many types of Public Key Cryptography, such as Elliptic Curve (EC) ...
Finite fields have been used for numerous applications including error-control coding and cryptograp...
A dual finite fields algorithm for elliptic curve cryptosystem (ECC) is presented. It can be used in...
Graduation date: 1999Today's computer and network communication systems rely on authenticated and\ud...
Abstract—In this paper we present an arithmetic logic unit (ALU) for elliptic curve cryptosystems ov...
The basic arithmetic operations (i.e. addition, multiplication, and inversion) in finite fields, GF ...
Cryptography is not the only means of providing information and network security, but rather one set...
Abstract: Problem statement: A fundamental building block for digital communication is the Public-ke...
144 p.The security strength of Public Key Cryptosystems (PKCs) is attributed to the complex computat...
International audienceComputational demanding public key cryptographic al...
The computation of the inverse of a number in finite fields, namely Galois Fields GF(p) or GF(2), is...
Instruction set extensions are a small number of custom instructions specifically designed to accele...
This paper describes a hardware-software co-design approach for flexible programmable Galois Field P...
This paper describes a hardware implementation of an arithmetic processor which is efficient for bit...
The high performance of an elliptic curve (EC) crypto system depends efficiently on the arithmetic i...
Finite fields have been used for many types of Public Key Cryptography, such as Elliptic Curve (EC) ...
Finite fields have been used for numerous applications including error-control coding and cryptograp...
A dual finite fields algorithm for elliptic curve cryptosystem (ECC) is presented. It can be used in...
Graduation date: 1999Today's computer and network communication systems rely on authenticated and\ud...
Abstract—In this paper we present an arithmetic logic unit (ALU) for elliptic curve cryptosystems ov...
The basic arithmetic operations (i.e. addition, multiplication, and inversion) in finite fields, GF ...
Cryptography is not the only means of providing information and network security, but rather one set...
Abstract: Problem statement: A fundamental building block for digital communication is the Public-ke...
144 p.The security strength of Public Key Cryptosystems (PKCs) is attributed to the complex computat...
International audienceComputational demanding public key cryptographic al...
The computation of the inverse of a number in finite fields, namely Galois Fields GF(p) or GF(2), is...
Instruction set extensions are a small number of custom instructions specifically designed to accele...
This paper describes a hardware-software co-design approach for flexible programmable Galois Field P...
This paper describes a hardware implementation of an arithmetic processor which is efficient for bit...
The high performance of an elliptic curve (EC) crypto system depends efficiently on the arithmetic i...