Article ID | Journal | Published Year | Pages | File Type |
---|---|---|---|---|
4599619 | Linear Algebra and its Applications | 2014 | 7 Pages |
Abstract
The Cayley transform, $(A)=(I−A)(I+A)−1$(A)=(I−A)(I+A)−1, maps skew-symmetric matrices to orthogonal matrices and vice versa. Given an orthogonal matrix Q, we can choose a diagonal matrix D with each diagonal entry ±1 (a signature matrix) and, if I+QDI+QD is nonsingular, calculate the skew-symmetric matrix $(QD)$(QD). An open problem is to show that, by a suitable choice of D , we can make every entry of $(QD)$(QD) less than or equal to 1 in absolute value. We solve this problem by showing that the principal minors of $(QD)$(QD) are related in a simple way to the principal minors of $(Q)$(Q).
Keywords
Related Topics
Physical Sciences and Engineering
Mathematics
Algebra and Number Theory
Authors
Evan O'Dorney,