Given complex numbers w1,..,wn, we define the weight w(X) of a set X of 0-1 vectors as the sum of over all vectors (x1,..,xn) in X. We present an algorithm which, for a set X defined by a system of homogeneous linear equations with at most r variables per equation and at most c equations per variable, computes w(X) within relative error ϵ > 0 in (rc)O(lnn-lnϵ) time provided for an absolute constant β > 0 and all j = 1,..,n. A similar algorithm is constructed for computing the weight of a linear code over. Applications include counting weighted perfect matchings in hypergraphs, counting weighted graph homomorphisms, computing weight enumerators of linear codes with sparse code generating matrices, and computing the partition functions of the...
Many research in coding theory is focussed on linear error-correcting codes. Since these codes are s...
As sequential computers seem to be approaching their limits in CPU speed there is increasing intere...
AbstractA Las Vegas randomized algorithm for solving sparse linear systems over principal ideal doma...
When piecewise-linear homotopy algorithms are applied to the problem of approximating a zero of a sp...
We give a new theoretical tool to solve sparse systems with finitely many solutions. It is based on ...
© Richard Ryan Williams. This paper provides both positive and negative results for counting solutio...
The polytope model is widely used in compiler analysis for representing a certain class of programs....
Abstract. Numerical linear algebra and combinatorial optimization are vast subjects; as is their int...
In this paper we present the research that has been done with Linear Dynamical Systems to generate a...
AbstractWe present a fast algorithm for solving m X n systems of linear equations A x = c with at mo...
Abstract. An algorithm is presented for counting the number of maximum weight satisfying assignments...
This paper describes implementations of eight algorithms of Newton and quasi-Newton type for solving...
A vector with at most k nonzeros is called k-sparse. We show that enumerating the support vectors of...
The following problems related to linear systems are studied: finding a diophantine solution; findin...
Полный текст статьи можно найти по адресу: http://scitation.aip.org/content/aip/proceeding/aipcp/10...
Many research in coding theory is focussed on linear error-correcting codes. Since these codes are s...
As sequential computers seem to be approaching their limits in CPU speed there is increasing intere...
AbstractA Las Vegas randomized algorithm for solving sparse linear systems over principal ideal doma...
When piecewise-linear homotopy algorithms are applied to the problem of approximating a zero of a sp...
We give a new theoretical tool to solve sparse systems with finitely many solutions. It is based on ...
© Richard Ryan Williams. This paper provides both positive and negative results for counting solutio...
The polytope model is widely used in compiler analysis for representing a certain class of programs....
Abstract. Numerical linear algebra and combinatorial optimization are vast subjects; as is their int...
In this paper we present the research that has been done with Linear Dynamical Systems to generate a...
AbstractWe present a fast algorithm for solving m X n systems of linear equations A x = c with at mo...
Abstract. An algorithm is presented for counting the number of maximum weight satisfying assignments...
This paper describes implementations of eight algorithms of Newton and quasi-Newton type for solving...
A vector with at most k nonzeros is called k-sparse. We show that enumerating the support vectors of...
The following problems related to linear systems are studied: finding a diophantine solution; findin...
Полный текст статьи можно найти по адресу: http://scitation.aip.org/content/aip/proceeding/aipcp/10...
Many research in coding theory is focussed on linear error-correcting codes. Since these codes are s...
As sequential computers seem to be approaching their limits in CPU speed there is increasing intere...
AbstractA Las Vegas randomized algorithm for solving sparse linear systems over principal ideal doma...