Original scientific paper
A Completely Parallelizable Algorithm for the Determinant of a Tridiagonal Matrix
A. Mahmood
; School of Electrical Engineering and Computer Science, Washington State University at Tri-Cities, Richland, U.S.A.
D. J. Lynch
; School of Electrical Engineering and Computer Science, Washington State University at Tri-Cities, Richland, U.S.A.
L. D. Philipp
; School of Electrical Engineering and Computer Science, Washington State University at Tri-Cities, Richland, U.S.A.
Abstract
A new parallel algorithm (MIMD-PRAM class) having parallel time complexity of log2 n for computing the determinant of a tridiagonal matrix is developed. The algorithm is based on coupling the determinants of two neighboring submatrix blocks. With each coupling, the block size is increased by a factor of two until the entire determinant of an n x n matrix is found by the final coupling of two n/2 sized blocks. It is shown that the determinant of an n x n tridiagonal matrix can be computed in (3 log2 n - 2) parallel steps with a maximum parallel requirement of 7 ( n/4) + 3 processors. The algorithm achieves linear speedup as the number of processors is increased.
Keywords
Determinant; Tridiagonal Matrix; Parallel Algorithm; MIMD; PRAM
Hrčak ID:
150477
URI
Publication date:
30.3.1994.
Visits: 1.153 *