Let x = (x1, x2...,xn be a vector of real numbers. X is said to possess an integer relation if there exist integers a(sub i) not all zero such that a1x1 + a2x2 + ... a(sub n)Xn = 0. Beginning in 1977 several algorithms (with proofs) have been discovered to recover the a(sub i) given x. The most efficient of these existing integer relation algorithms (in terms of run time and the precision required of the input) has the drawback of being very unstable numerically. It often requires a numeric precision level in the thousands of digits to reliably recover relations in modest-sized test problems. We present here a new algorithm for finding integer relations, which we have named the "PSLQ" algorithm. It is proved in this paper that the PSLQ algo...
International audienceComputing transitive closures of integer relations is the key tofinding precis...
AbstractIn this paper, we present a new algorithm for the exact solutions of linear systems with int...
In this section is presented a new integer number algorithm for linear equation. This algorithm is m...
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 K be either the real, complex, or quaternion number system and let O(K) be the corresp...
We study the following problem: given x element Rn either find a short integer relation m element Zn...
Abstract. Let {x1,x2, ·· ·,xn} be a vector of real numbers. An integer relation algorithm is a compu...
This is work in progress. Please let me know about any comments and suggestions. 1 What PSLQ is abou...
In this paper we define the parameterized integer relation construction algorithm PSLQ(tau), where t...
Let a be a vector of real numbers. By an integer relation for a we mean a non-zero integer vector c ...
We review polynomial time approaches for computing simultaneous integer relations among real numbers...
Given x 2 R n an integer relation for x is a nontrivial vector m 2 Z n with inner product hm; xi...
AbstractGiven x ϵ Rn an integer relation for x is a non-trivial vector m ϵ Zn with inner product 〈m,...
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...
International audienceComputing transitive closures of integer relations is the key tofinding precis...
AbstractIn this paper, we present a new algorithm for the exact solutions of linear systems with int...
In this section is presented a new integer number algorithm for linear equation. This algorithm is m...
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 K be either the real, complex, or quaternion number system and let O(K) be the corresp...
We study the following problem: given x element Rn either find a short integer relation m element Zn...
Abstract. Let {x1,x2, ·· ·,xn} be a vector of real numbers. An integer relation algorithm is a compu...
This is work in progress. Please let me know about any comments and suggestions. 1 What PSLQ is abou...
In this paper we define the parameterized integer relation construction algorithm PSLQ(tau), where t...
Let a be a vector of real numbers. By an integer relation for a we mean a non-zero integer vector c ...
We review polynomial time approaches for computing simultaneous integer relations among real numbers...
Given x 2 R n an integer relation for x is a nontrivial vector m 2 Z n with inner product hm; xi...
AbstractGiven x ϵ Rn an integer relation for x is a non-trivial vector m ϵ Zn with inner product 〈m,...
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...
International audienceComputing transitive closures of integer relations is the key tofinding precis...
AbstractIn this paper, we present a new algorithm for the exact solutions of linear systems with int...
In this section is presented a new integer number algorithm for linear equation. This algorithm is m...