AbstractWe consider the problem of finding a basic solution to a system of linear constraints (in standard form) given a non-basic solution to the system. We show that the known arithmetic complexity bounds for this problem admit considerable improvement. Our technique, which is similar in spirit to that used by Vaidya to find the best complexity bounds for linear programming, is based on reducing much of the computation involved to matrix multiplication. Consequently, our complexity bounds in their most general form are a function of the complexity of matrix multiplication. Using the best known algorithm for matrix multiplication, we achieve a running time of O(m1.594 n) arithmetic operations for an m × n problem in standard form. Previous...
In this paper we show a simple treatment of the complexity of Linear Programming. We describe the sh...
These notes are based on a lecture given at the Toronto Student Seminar on February 2, 2012. The mat...
AbstractAn N × N matrix product can be evaluated with precision E > 0 in O(Ns+ϵ log (M/E) log log (M...
AbstractWe consider the problem of finding a basic solution to a system of linear constraints (in st...
AbstractThe numbers of bit operations (bt) required for matrix multiplication (MM), matrix inversion...
This electronic version was submitted by the student author. The certified thesis is available in th...
This study examines the complexity of linear algebra. Complexity means how much work, or the number ...
The complexity of matrix multiplication (hereafter MM) has been intensively studied since 1969, when...
AbstractFirst we study asymptotically fast algorithms for rectangular matrix multiplication. We begi...
This work was also published as a Rice University thesis/dissertation: http://hdl.handle.net/1911/16...
Following the breakthrough work of Tardos (Oper. Res. '86) in the bit-complexity model, Vavasis and ...
A simplex-based method of solving specific classes of large-scale linear programs is presented. The ...
Matrix multiplication is a basic operation of linear algebra, and has numerous applications to the t...
Asymptotically tight lower bounds are derived for the I/O complexity of a general class of hybrid al...
AbstractThe main purpose of this paper is to present a fast matrix multiplication algorithm taken fr...
In this paper we show a simple treatment of the complexity of Linear Programming. We describe the sh...
These notes are based on a lecture given at the Toronto Student Seminar on February 2, 2012. The mat...
AbstractAn N × N matrix product can be evaluated with precision E > 0 in O(Ns+ϵ log (M/E) log log (M...
AbstractWe consider the problem of finding a basic solution to a system of linear constraints (in st...
AbstractThe numbers of bit operations (bt) required for matrix multiplication (MM), matrix inversion...
This electronic version was submitted by the student author. The certified thesis is available in th...
This study examines the complexity of linear algebra. Complexity means how much work, or the number ...
The complexity of matrix multiplication (hereafter MM) has been intensively studied since 1969, when...
AbstractFirst we study asymptotically fast algorithms for rectangular matrix multiplication. We begi...
This work was also published as a Rice University thesis/dissertation: http://hdl.handle.net/1911/16...
Following the breakthrough work of Tardos (Oper. Res. '86) in the bit-complexity model, Vavasis and ...
A simplex-based method of solving specific classes of large-scale linear programs is presented. The ...
Matrix multiplication is a basic operation of linear algebra, and has numerous applications to the t...
Asymptotically tight lower bounds are derived for the I/O complexity of a general class of hybrid al...
AbstractThe main purpose of this paper is to present a fast matrix multiplication algorithm taken fr...
In this paper we show a simple treatment of the complexity of Linear Programming. We describe the sh...
These notes are based on a lecture given at the Toronto Student Seminar on February 2, 2012. The mat...
AbstractAn N × N matrix product can be evaluated with precision E > 0 in O(Ns+ϵ log (M/E) log log (M...