Add to ORKGWe give polynomial-time quantum algorithms for two problems from computational algebraic number theory. The first is Pell’s equation. Given a positive non-square integer d, Pell’s equation is x^2 − dy^2 = 1 and the goal is to find its integer solutions. Factoring integers reduces to finding integer solutions of Pell’s equation, but a reduction in the other direction is not known and appears more difficult. The second problem is the principal ideal problem in real quadratic number fields. Solving this problem is at least as hard as solving Pell’s equation, and is the basis of a cryptosystem which is broken by our algorithm
This paper is an investigation of Pell Equations-equations of the form x2 - dy2 = k where d is a non...
In this paper we focused on the factorization of integer in detail using well known Shor’s algorithm...
Quantum algorithm is an algorithm for solving mathematical problems using quantum systems encoded as...
We give polynomial-time quantum algorithms for two problems from computational algebraic number the...
We give polynomial-time quantum algorithms for two problems from computational algebraic number theo...
Pell's equation is x^2-d*y^2=1 where d is a square-free integer and we seek positive integer solutio...
In this note, we describe a quantum polynomial time attack on the cryptosystems<br>based on the hard...
Infrastructures are group-like objects that make their appearance in arithmetic geometry in the stud...
Infrastructures are group-like objects that make their appearance in arithmetic geometry in the stud...
Given an algebraic number field K, such that [K: Q] is constant, we show that the problem of computi...
Abstract. In this article, we discuss some quantum algorithms for determining the group of units and...
We discuss classical and quantum algorithms for solvability testing and finding integer solutions x,...
Quantum computers can produce a quantum encoding of the solution of a system of differential equatio...
Solving linear systems of equations is a common problem that arises both on its own and as a subrout...
When faced with a quantum-solving problem for partial differential equations, people usually transfo...
This paper is an investigation of Pell Equations-equations of the form x2 - dy2 = k where d is a non...
In this paper we focused on the factorization of integer in detail using well known Shor’s algorithm...
Quantum algorithm is an algorithm for solving mathematical problems using quantum systems encoded as...
We give polynomial-time quantum algorithms for two problems from computational algebraic number the...
We give polynomial-time quantum algorithms for two problems from computational algebraic number theo...
Pell's equation is x^2-d*y^2=1 where d is a square-free integer and we seek positive integer solutio...
In this note, we describe a quantum polynomial time attack on the cryptosystems<br>based on the hard...
Infrastructures are group-like objects that make their appearance in arithmetic geometry in the stud...
Infrastructures are group-like objects that make their appearance in arithmetic geometry in the stud...
Given an algebraic number field K, such that [K: Q] is constant, we show that the problem of computi...
Abstract. In this article, we discuss some quantum algorithms for determining the group of units and...
We discuss classical and quantum algorithms for solvability testing and finding integer solutions x,...
Quantum computers can produce a quantum encoding of the solution of a system of differential equatio...
Solving linear systems of equations is a common problem that arises both on its own and as a subrout...
When faced with a quantum-solving problem for partial differential equations, people usually transfo...
This paper is an investigation of Pell Equations-equations of the form x2 - dy2 = k where d is a non...
In this paper we focused on the factorization of integer in detail using well known Shor’s algorithm...
Quantum algorithm is an algorithm for solving mathematical problems using quantum systems encoded as...