مرکز منطقه ای اطلاع رساني علوم و فناوري - Solving sparse linear equations over finite fields

DocumentCode :

941172

Title :

Solving sparse linear equations over finite fields

Author :

Wiedemann, Douglas H.

Volume :

Issue :

fYear :

1986

fDate :

1/1/1986 12:00:00 AM

Firstpage :

Lastpage :

Abstract :

A "coordinate recurrence" method for solving sparse systems of linear equations over finite fields is described. The algorithms discussed all require $O(n_{1}(\\omega + n_{1})\\log ^{k}n_{1})$ field operations, where $n_{1}$ is the maximum dimension of the coefficient matrix, $\\omega$ is approximately the number of field operations required to apply the matrix to a test vector, and the value of $k$ depends on the algorithm. A probabilistic algorithm is shown to exist for finding the determinant of a square matrix. Also, probabilistic algorithms are shown to exist for finding the minimum polynomial and rank with some arbitrarily small possibility of error.