Some Operator Bounds Employing Complex Interpolation Revisited

Abstract

We revisit and extend known bounds on operator-valued functions of the type T1-z S T2-1+z, z ∈ = \z∈\,|\, (z) ∈ [0,1]\, under various hypotheses on the linear operators S and Tj, j=1,2. We particularly single out the case of self-adjoint and sectorial operators Tj in some separable complex Hilbert space j, j=1,2, and suppose that S (resp., S*) is a densely defined closed operator mapping (S) ⊂eq 1 into 2 (resp., (S*) ⊂eq 2 into 1), relatively bounded with respect to T1 (resp., T2*). Using complex interpolation methods, a generalized polar decomposition for S, and Heinz's inequality, the bounds we establish lead to inequalities of the following type, align* & \|T2-xST1-1+x\|(1,2) ≤ N1 N2 e(θ1 + θ2) [x(1-x)]1/2 \\ & × \|ST1-1\|(1,2)1-x \, \|S*(T2*)-1\|(2,1)x, x ∈ [0,1], align* assuming that Tj have bounded imaginary powers, that is, for some Nj 1 and θj 0, \|Tjis\|() ≤ Nj eθj |s|, s ∈ , \; j=1,2. We also derive analogous bounds with (1,2) replaced by trace ideals, p(1, 2), p ∈ [1,∞). The methods employed are elementary, predominantly relying on Hadamard's three-lines theorem and Heinz's inequality.