Unconstrained representation of orthogonal matrices with application to common principle components

Abstract: Many statistical problems involve the estimation of a (d × d) orthogonal matrix Q. Such an estimation is often challenging due to the orthonormality constraints on Q. To cope with this problem, we propose a very simple decomposition for orthogonal matrices which we abbreviate as PLR decomposition. It produces a one-to-one correspondence between Q and a (d × d) unit lower triangular matrix L whose d (d − 1) /2 entries below the diagonal are unconstrained real values. Once the decomposition is applied, regardles… Show more