We present a fast an extensible algorithm for computing upper and lower bounds on the number of solutions to a system of equations. For a given size of variables (e.g. 32 bits), the algorithm can be run in time linear in the number of terms and variables, at the cost of looser bounds.
We give simple new lower bounds on the lengths of Resolution proofs for the pigeonhole principle and...
This paper describes an inter-procedural technique for computing symbolic bounds on the number of st...
We define a computable function f from positive integers to positive integers. We formulate a hypoth...
Abstract1Several algorithms are known that solve a system of m linear inequalities in n variables us...
. We present a new algorithm which computes a partial approximate solution for a system of equations...
AbstractWe present a complete and practical algorithm which can determine the number of distinct rea...
In order to produce efficient parallel programs, optimizing compilers need to include an analysis of...
We give an algorithm for counting the number of max-weight solutions to a 2SAT formula, and improve ...
We develop an algorithm to generate the set of all solutions to a system of linear Diophantine equat...
Using a directed acyclic graph (dag) model of algorithms, we solve a problem related to precedence-c...
Using a directed acyclic graph (dag) model of algorithms, we solve a problem related to precedence-c...
AbstractWe Count the number of solutions with height less than or equal to B to a system of linear e...
AbstractWe present a fast algorithm for solving m X n systems of linear equations A x = c with at mo...
AbstractWe consider the problem of finding a basic solution to a system of linear constraints (in st...
© Richard Ryan Williams. This paper provides both positive and negative results for counting solutio...
We give simple new lower bounds on the lengths of Resolution proofs for the pigeonhole principle and...
This paper describes an inter-procedural technique for computing symbolic bounds on the number of st...
We define a computable function f from positive integers to positive integers. We formulate a hypoth...
Abstract1Several algorithms are known that solve a system of m linear inequalities in n variables us...
. We present a new algorithm which computes a partial approximate solution for a system of equations...
AbstractWe present a complete and practical algorithm which can determine the number of distinct rea...
In order to produce efficient parallel programs, optimizing compilers need to include an analysis of...
We give an algorithm for counting the number of max-weight solutions to a 2SAT formula, and improve ...
We develop an algorithm to generate the set of all solutions to a system of linear Diophantine equat...
Using a directed acyclic graph (dag) model of algorithms, we solve a problem related to precedence-c...
Using a directed acyclic graph (dag) model of algorithms, we solve a problem related to precedence-c...
AbstractWe Count the number of solutions with height less than or equal to B to a system of linear e...
AbstractWe present a fast algorithm for solving m X n systems of linear equations A x = c with at mo...
AbstractWe consider the problem of finding a basic solution to a system of linear constraints (in st...
© Richard Ryan Williams. This paper provides both positive and negative results for counting solutio...
We give simple new lower bounds on the lengths of Resolution proofs for the pigeonhole principle and...
This paper describes an inter-procedural technique for computing symbolic bounds on the number of st...
We define a computable function f from positive integers to positive integers. We formulate a hypoth...