A Sherman-Morrison-Woodbury Identity for Rank Augmenting Matrices with Application to Centering

Abstract

Matrices of the form A + (V1 + W1)G(V2 + W2)* are considered where A is a singular × matrix and G is a nonsingular k × k matrix, k . Let the columns of V1 be in the column space of A and the columns of W1 be orthogonal to A. Similarly, let the columns of V2 be in the column space of A* and the columns of W2 be orthogonal to A*. An explicit expression for the inverse is given, provided that Wi* Wi has rank k. %and W1 and W2 have the same column space. An application to centering covariance matrices about the mean is given.