A Dirac delta operator

Abstract

If T is a (densely defined) self-adjoint operator acting on a complex Hilbert space H and I stands for the identity operator, we introduce the delta function operator λ δ (λ I-T) at T. When T is a bounded operator, then δ (λ I-T) is an operator-valued distribution. If T is unbounded, δ (λ I-T) is a more general object that still retains some properties of distributions. We derive various operative formulas involving δ (λ I-T) and give several applications of its usage.