Double operator integral methods applied to continuity of spectral shift functions

Abstract

We derive two main results: First, assume that A, B, An, Bn are self-adjoint operators in the Hilbert space H, and suppose that An converges to A and Bn to B in strong resolvent sense as n ∞. Fix m ∈ N, m odd, p ∈ [1,∞), and assume that T:= [( A + iIH)-m - ( B + iIH)-m] ∈ Bp(H), Tn := [( An + iIH)-m - ( Bn + iIH)-m] ∈ Bp(H), and n → ∞ \|Tn - T\|Bp(H) =0. Then for any function f in the class Fk(R) ⊃ C0∞(R) (cf. (1.1)), n → ∞ \| [f(An) - f(Bn)] - [f(A)- f(B)]\|Bp(H)=0. Our second result concerns the continuity of spectral shift functions (·; B,B0) with respect to the operator parameter B. For T self-adjoint in H we denote by m(T), m ∈ N odd, the set of all self-adjoint operators S in H satisfying [(S - z IH)-m - (T - z IH)-m] ∈ B1(H), z ∈ C R. Employing a suitable topology on m(T) (cf. (1.9), we prove the following: Suppose that B1∈ m(B0) and let \Bτ\τ∈ [0,1]⊂ m(B0) denote a path from B0 to B1 in m(B0) depending continuously on τ∈ [0,1] with respect to the topology on m(B0). If f ∈ L∞(R), then τ 0+ \|(\, · \, ; Bτ, A0) f - (\, · \, ; B0, A0) f\|L1(R; (||m+1 + 1)-1d) = 0.