Add to ORKGWe study the following problem: given x element Rn either find a short integer relation m element Zn, so that =0 holds for the inner product , or prove that no short integer relation exists for x. Hastad, Just Lagarias and Schnorr (1989) give a polynomial time algorithm for the problem. We present a stable variation of the HJLS--algorithm that preserves lower bounds on lambda(x) for infinitesimal changes of x. Given x \in {\RR}^n and \alpha \in \NN this algorithm finds a nearby point x' and a short integer relation m for x'. The nearby point x' is 'good' in the sense that no very short relation exists for points \bar{x} within half the x'--distance from x. On the other hand if x'=x then m is, up to a factor 2^{n/2}, a shortest integer relat...
Abstract. We prove that to nd a nontrivial integer linear relation between vectors of a lattice L I...
We review polynomial time approaches for computing simultaneous integer relations among real numbers...
We consider the following problem: Given a rational matrix A ∈ Qm×n and a rational polyhe-dron Q ⊆ R...
Let x = (x1, x2...,xn be a vector of real numbers. X is said to possess an integer relation if there...
Given x 2 R n an integer relation for x is a nontrivial vector m 2 Z n with inner product hm; xi...
Given x small epsilon, Greek Rn an integer relation for x is a non-trivial vector m small epsilon, G...
We call a vector x/spl isin/R/sup n/ highly regular if it satisfies =0 for some short, non-zero inte...
AbstractGiven x ϵ Rn an integer relation for x is a non-trivial vector m ϵ Zn with inner product 〈m,...
Abstract. Let K be either the real, complex, or quaternion number system and let O(K) be the corresp...
Let x = (x{sub 1}, x{sub 2} {hor_ellipsis}, x{sub n}) be a vector of real or complex numbers. x is s...
Abstract. Let {x1,x2, ·· ·,xn} be a vector of real numbers. An integer relation algorithm is a compu...
Let a be a vector of real numbers. By an integer relation for a we mean a non-zero integer vector c ...
In this paper we define the parameterized integer relation construction algorithm PSLQ(tau), where t...
In many applications of real-number computation we need to evaluate elementary functions such as exp...
This is work in progress. Please let me know about any comments and suggestions. 1 What PSLQ is abou...
Abstract. We prove that to nd a nontrivial integer linear relation between vectors of a lattice L I...
We review polynomial time approaches for computing simultaneous integer relations among real numbers...
We consider the following problem: Given a rational matrix A ∈ Qm×n and a rational polyhe-dron Q ⊆ R...
Let x = (x1, x2...,xn be a vector of real numbers. X is said to possess an integer relation if there...
Given x 2 R n an integer relation for x is a nontrivial vector m 2 Z n with inner product hm; xi...
Given x small epsilon, Greek Rn an integer relation for x is a non-trivial vector m small epsilon, G...
We call a vector x/spl isin/R/sup n/ highly regular if it satisfies =0 for some short, non-zero inte...
AbstractGiven x ϵ Rn an integer relation for x is a non-trivial vector m ϵ Zn with inner product 〈m,...
Abstract. Let K be either the real, complex, or quaternion number system and let O(K) be the corresp...
Let x = (x{sub 1}, x{sub 2} {hor_ellipsis}, x{sub n}) be a vector of real or complex numbers. x is s...
Abstract. Let {x1,x2, ·· ·,xn} be a vector of real numbers. An integer relation algorithm is a compu...
Let a be a vector of real numbers. By an integer relation for a we mean a non-zero integer vector c ...
In this paper we define the parameterized integer relation construction algorithm PSLQ(tau), where t...
In many applications of real-number computation we need to evaluate elementary functions such as exp...
This is work in progress. Please let me know about any comments and suggestions. 1 What PSLQ is abou...
Abstract. We prove that to nd a nontrivial integer linear relation between vectors of a lattice L I...
We review polynomial time approaches for computing simultaneous integer relations among real numbers...
We consider the following problem: Given a rational matrix A ∈ Qm×n and a rational polyhe-dron Q ⊆ R...