Jump to content

Semi-orthogonal matrix

From Wikipedia, the free encyclopedia

This is an old revision of this page, as edited by Altamel (talk | contribs) at 03:15, 2 February 2014 (Added {{reflist}}). The present address (URL) is a permanent link to this revision, which may differ significantly from the current revision.

In linear algebra, a semi-orthogonal matrix is a non-square matrix with real entries where: if the number of columns exceeds the number of rows, then the rows are orthonormal vectors; but if the number of rows exceeds the number of columns, then the columns are orthonormal vectors.

Equivalently, a non-square matrix A is semi-orthogonal if either

[1]

In the following, consider the case where A is an m × n matrix for m > n. Then

which implies the isometry property

for all x in Rn.

For example, is a semi-orthogonal matrix.

A semi-orthogonal matrix A is semi-unitary (either AA = I or AA = I) and either left-invertible or right-invertible (left-invertible if it has more rows than columns, otherwise right invertible). As a linear transformation applied from the left, a semi-orthogonal matrix with more rows than columns preserves the dot product of vectors, and therefore acts as an isometry of Euclidean space, such as a rotation or reflection.

References

  1. ^ Abadir, K.M., Magnus, J.R. (2005). Matrix Algebra. Cambridge University Press.