Title of article
Customizable triangular factorizations of matrices Original Research Article
Author/Authors
Pengwei Hao، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2004
Pages
20
From page
135
To page
154
Abstract
Customizable triangular factorizations of matrices find their applications in computer graphics and lossless transform coding. In this paper, we prove that any N × N nonsingular matrix A can be factorized into 3 triangular matrices, A=PLUS, where P is a permutation matrix, L is a unit lower triangular matrix, U is an upper triangular matrix of which the diagonal entries are customizable and can be given by all means as long as its determinant is equal to that of A up to a possible sign adjustment, and S is a unit lower triangular matrix of which all but N−1 off-diagonal elements are set zeros and the positions of those N−1 elements are also flexibly customizable, such as a single-row, a single-column, a bidiagonal matrix or other specially patterned matrices. A pseudo-permutation matrix, which is a simple unit upper triangular matrix with off-diagonal elements being 0, 1 or −1, can take the role of the permutation matrix P as well. In some cases, P may be the identity matrix. Besides PLUS, a customizable factorization also has other alternatives, LUSP, PSUL or SULP for lower S, and PULS, ULSP, PSLU, SLUP for upper S.
Keywords
Triangular matrix , Triangular factorization , Reversible integer transform , Rotation by shears
Journal title
Linear Algebra and its Applications
Serial Year
2004
Journal title
Linear Algebra and its Applications
Record number
824417
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