Add to ORKGThe NTRU cryptography is a lattice-based public key cryptography. Encryption and decryption process in NTRU are based on polynomial multiplication. This property makes NTRU to be very fast compared to other public key cryptography algorithm such as elliptic curve cryptography and RSA. In order to fast implementation of NTRU, hardware implementation of NTRU by employing residue number system is presented. To achieve high speed implementation, balanced three moduli set {2n, 2n+1-1, 2n-1} is considered and the encryption and part of decryption process are implemented by considered RNS bases. The result shows the noticeable improvement compared to original NTRU cryptography
NTRU is a public-key cryptosystem based on the shortest vector problem in a lattice which is an alte...
The 1996 proposal by Hoffstein, Pfeiffer, and Silverman for the NTRU public key encryption system pr...
NTRU is a public key cryptosystem whose structure is based on the polynomial ring of integers. We pr...
Nth-Dimensional Truncated Polynomial Ring (NTRU) is a lattice-based public-key cryptosystem that off...
Nth-Dimensional Truncated Polynomial Ring (NTRU) is a lattice-based public-key cryptosystem that off...
Several ideal-lattice-based cryptosystems have been broken by recent attacks that exploit special st...
Several ideal-lattice-based cryptosystems have been broken by recent attacks that exploit special st...
Several ideal-lattice-based cryptosystems have been broken by recent attacks that exploit special st...
NTRU is a lattice-based public-key cryptosystem that has been selected as one of the Round III final...
NTRU is a lattice-based public-key cryptosystem that has been selected as one of the Round III final...
Abstract — In these days, Security is necessary for all the applications on the network. Number of m...
In this paper, new software and hardware designs for the NTRU Public Key Cryp-tosystem are proposed....
In this paper, new software and hardware designs for the NTRU Public Key Cryptosystem are proposed. ...
The theses firstly introduces the basics of lattice problems. Then it focuses on various aspects of ...
\u3cbr/\u3eSeveral ideal-lattice-based cryptosystems have been broken by recent attacks that exploit...
NTRU is a public-key cryptosystem based on the shortest vector problem in a lattice which is an alte...
The 1996 proposal by Hoffstein, Pfeiffer, and Silverman for the NTRU public key encryption system pr...
NTRU is a public key cryptosystem whose structure is based on the polynomial ring of integers. We pr...
Nth-Dimensional Truncated Polynomial Ring (NTRU) is a lattice-based public-key cryptosystem that off...
Nth-Dimensional Truncated Polynomial Ring (NTRU) is a lattice-based public-key cryptosystem that off...
Several ideal-lattice-based cryptosystems have been broken by recent attacks that exploit special st...
Several ideal-lattice-based cryptosystems have been broken by recent attacks that exploit special st...
Several ideal-lattice-based cryptosystems have been broken by recent attacks that exploit special st...
NTRU is a lattice-based public-key cryptosystem that has been selected as one of the Round III final...
NTRU is a lattice-based public-key cryptosystem that has been selected as one of the Round III final...
Abstract — In these days, Security is necessary for all the applications on the network. Number of m...
In this paper, new software and hardware designs for the NTRU Public Key Cryp-tosystem are proposed....
In this paper, new software and hardware designs for the NTRU Public Key Cryptosystem are proposed. ...
The theses firstly introduces the basics of lattice problems. Then it focuses on various aspects of ...
\u3cbr/\u3eSeveral ideal-lattice-based cryptosystems have been broken by recent attacks that exploit...
NTRU is a public-key cryptosystem based on the shortest vector problem in a lattice which is an alte...
The 1996 proposal by Hoffstein, Pfeiffer, and Silverman for the NTRU public key encryption system pr...
NTRU is a public key cryptosystem whose structure is based on the polynomial ring of integers. We pr...
