Abstract. We accelerate the known algorithms for computing a selected entry of the extended Euclidean algorithm for integers and, consequently, for the modular and numerical rational number reconstruction problems. The acceleration is from quadratic to nearly linear time, matching the known complexity bound for the integer gcd, which our algorithm computes as a special case
In this article we formalize in Mizar [1], [2] the maximum number of steps taken by some number theo...
Algorithms in computational geometry often use the real-RAM model of computation. In particular, th...
Abstract We describe some applications of the Euclidean algorithm in modern computational problems l...
AbstractAn efficient algorithm is presented for reconstructing a rational number from its residue mo...
Let F be a field, f, g E F[z] with rn = deg f > deg g > 0. Our problem is to find a rational f...
© 2020, Allerton Press, Inc. We study the problem of acceleration of GCD algorithms for natural numb...
noneThe greatest common divisor of two integers a and b can be found by the Euclidean algorithm by ...
AbstractA new parallel extended GCD algorithm is proposed. It matches the best existing parallel int...
The present paper analyses and presents several improvements to the algorithm for finding the (a, b)...
© 2019, Kazan Federal University. All rights reserved. In this paper, methods of acceleration of GCD...
AbstractA new version of the Euclidean algorithm is developed for computing the greatest common divi...
We present a new GCD algorithm of two integers or polynomials. The algorithm is iterative and its ti...
International audienceWe give new simple algorithms for the fast computation of the quotient boot an...
We develop an algorithm to generate the set of all solutions to a system of linear Diophantine equat...
A new version of the Euclidean algorithm is developed for computing the greatest com-mon divisor of ...
In this article we formalize in Mizar [1], [2] the maximum number of steps taken by some number theo...
Algorithms in computational geometry often use the real-RAM model of computation. In particular, th...
Abstract We describe some applications of the Euclidean algorithm in modern computational problems l...
AbstractAn efficient algorithm is presented for reconstructing a rational number from its residue mo...
Let F be a field, f, g E F[z] with rn = deg f > deg g > 0. Our problem is to find a rational f...
© 2020, Allerton Press, Inc. We study the problem of acceleration of GCD algorithms for natural numb...
noneThe greatest common divisor of two integers a and b can be found by the Euclidean algorithm by ...
AbstractA new parallel extended GCD algorithm is proposed. It matches the best existing parallel int...
The present paper analyses and presents several improvements to the algorithm for finding the (a, b)...
© 2019, Kazan Federal University. All rights reserved. In this paper, methods of acceleration of GCD...
AbstractA new version of the Euclidean algorithm is developed for computing the greatest common divi...
We present a new GCD algorithm of two integers or polynomials. The algorithm is iterative and its ti...
International audienceWe give new simple algorithms for the fast computation of the quotient boot an...
We develop an algorithm to generate the set of all solutions to a system of linear Diophantine equat...
A new version of the Euclidean algorithm is developed for computing the greatest com-mon divisor of ...
In this article we formalize in Mizar [1], [2] the maximum number of steps taken by some number theo...
Algorithms in computational geometry often use the real-RAM model of computation. In particular, th...
Abstract We describe some applications of the Euclidean algorithm in modern computational problems l...
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