The a priori Tan Theta Theorem for spectral subspaces

Abstract

Let A be a self-adjoint operator on a separable Hilbert space H. Assume that the spectrum of A consists of two disjoint components s0 and s1 such that the set s0 lies in a finite gap of the set s1. Let V be a bounded self-adjoint operator on H off-diagonal with respect to the partition spec(A)=s0 s1. It is known that if ||V||<2d, where d=(s0,s1), then the perturbation V does not close the gaps between s0 and s1 and the spectrum of the perturbed operator L=A+V consists of two isolated components s'0 and s'1 grown from s0 and s1, respectively. Furthermore, it is known that if V satisfies the stronger bound ||V||< d then the following sharp norm estimate holds: ||EL(s'0)-EA(s0)|| ≤ sin(arctan(||V||/d)), where EA(s0) and EL(s'0) are the spectral projections of A and L associated with the spectral sets s0 and s'0, respectively. In the present work we prove that this estimate remains valid and sharp also for d ≤ ||V||< 2d, which completely settles the issue.