<--- Back to Details
First PageDocument Content
Cryptography / Finite fields / Public-key cryptography / Euclidean algorithm / Factorization of polynomials over a finite field and irreducibility tests / Mathematics / Mathematical analysis / Polynomials
Date: 1998-04-13 22:10:00
Cryptography
Finite fields
Public-key cryptography
Euclidean algorithm
Factorization of polynomials over a finite field and irreducibility tests
Mathematics
Mathematical analysis
Polynomials

Fast Cryptanalysis of the Matsumoto-Imai Public Key Scheme P. Delsarte Philips Research Laboratory, Avenue Van Becelaere, 2 B-1170 Brussels, Belgium Y. Desmedt

Add to Reading List

Source URL: www.dtc.umn.edu

Download Document from Source Website

File Size: 19,88 KB

Share Document on Facebook

Similar Documents

An algorithm for realizing Euclidean distance matrices Jorge Alencar 1 Instituto Federal de Educa¸c˜ ao, Ciˆencia e Tecnologia do Sul de Minas Gerais, Inconfidentes, MG, Brazil

An algorithm for realizing Euclidean distance matrices Jorge Alencar 1 Instituto Federal de Educa¸c˜ ao, Ciˆencia e Tecnologia do Sul de Minas Gerais, Inconfidentes, MG, Brazil

DocID: 1uZU2 - View Document

A COMPLETE WORST-CASE ANALYSIS OF KANNAN’S SHORTEST LATTICE VECTOR ALGORITHM ´† GUILLAUME HANROT∗ AND DAMIEN STEHLE Abstract. Computing a shortest nonzero vector of a given euclidean lattice and computing a closes

A COMPLETE WORST-CASE ANALYSIS OF KANNAN’S SHORTEST LATTICE VECTOR ALGORITHM ´† GUILLAUME HANROT∗ AND DAMIEN STEHLE Abstract. Computing a shortest nonzero vector of a given euclidean lattice and computing a closes

DocID: 1uAnv - View Document

THE EUCLIDEAN ALGORITHM IN ALGEBRAIC NUMBER FIELDS FRANZ LEMMERMEYER Abstract. This article, which is an update of a version published 1995 in Expo. Math., intends to survey what is known about Euclidean number fields;

THE EUCLIDEAN ALGORITHM IN ALGEBRAIC NUMBER FIELDS FRANZ LEMMERMEYER Abstract. This article, which is an update of a version published 1995 in Expo. Math., intends to survey what is known about Euclidean number fields;

DocID: 1uads - View Document

Notes on continued fractions 1. Chapter 49: The Topsy-turvy world of continued fractions First, let’s go back, way back, to the Euclidean algorithm. Let’s say for 23 and 5. If we run this through we get 23 = 4 ∗ 5

Notes on continued fractions 1. Chapter 49: The Topsy-turvy world of continued fractions First, let’s go back, way back, to the Euclidean algorithm. Let’s say for 23 and 5. If we run this through we get 23 = 4 ∗ 5

DocID: 1tH6y - View Document

Research Article Climbing the Steiner Tree—Sources of Active Information in a Genetic Algorithm for Solving the Euclidean Steiner Tree Problem Winston Ewert,1* William Dembski,2 Robert J. Marks II1

Research Article Climbing the Steiner Tree—Sources of Active Information in a Genetic Algorithm for Solving the Euclidean Steiner Tree Problem Winston Ewert,1* William Dembski,2 Robert J. Marks II1

DocID: 1tff1 - View Document