On Lieb-Robinson Bounds for the Double Bracket Flow

Abstract

We consider the possibility of developing a Lieb-Robinson bound for the double bracket flow. This is a differential equation ∂B H(B)=[[V,H(B)],H(B)] which may be used to diagonalize Hamiltonians. Here, V is fixed and H(0)=H. We argue (but do not prove) that H(B) need not converge to a limit for nonzero real B in the infinite volume limit, even assuming several conditions on H(0). However, we prove Lieb-Robinson bounds for all B for the double-bracket flow for free fermion systems, but the range increases exponentially with the control parameter B.