Eigenvectors from eigenvalues: A survey of a basic identity in linear algebra

Abstract

If A is an n × n Hermitian matrix with eigenvalues λ1(A),…,λn(A) and i,j = 1,…,n, then the jth component vi,j of a unit eigenvector vi associated to the eigenvalue λi(A) is related to the eigenvalues λ1(Mj),…,λn-1(Mj) of the minor Mj of A formed by removing the jth row and column by the formula |vi,j|2Πk=1;k≠ in(λi(A)-λk(A))=Πk=1n-1(λi(A)-λk(Mj))\,. We refer to this identity as the eigenvector-eigenvalue identity and show how this identity can also be used to extract the relative phases between the components of any given eigenvector. Despite the simple nature of this identity and the extremely mature state of development of linear algebra, this identity was not widely known until very recently. In this survey we describe the many times that this identity, or variants thereof, have been discovered and rediscovered in the literature (with the earliest precursor we know of appearing in 1834). We also provide a number of proofs and generalizations of the identity.