A note on the spectral theorem (Q756093)

Let A be a bounded selfadjoint operator, let F(\(\lambda\)), \(a\leq \lambda \leq b\), be the spectral projections of the operator A, and let S be a quasi-affinity (a bounded injective operator with dense range). The authors choose the spectral family \(E(\lambda)f=SF(\lambda)S^{-1}f\), \(f\in Ran S\), \(\lambda\in [a,b]\), and use this spectral family to establish a spectral theorem and a functional calculus for a class of operators which includes operators H such that \(HS=SA\) and \(\sigma (H)=\sigma (A)\).