The notion of observable and the moment problem for *-algebras and their GNS representations

Abstract

We address some usually overlooked issues concerning the use of *-algebras in quantum theory and their physical interpretation. If A is a *-algebra describing a quantum system and ωA a state, we focus in particular on the interpretation of ω(a) as expectation value for an algebraic observable a=a*∈A, studying the problem of finding a probability measure reproducing the moments \ω(an)\n∈N. This problem enjoys a close relation with the self-adjointeness of the (in general only symmetric) operator πω(a) in the GNS representation of ω and thus it has important consequences for the interpretation of a as an observable. We provide physical examples (also from QFT) where the moment problem for \ω(an)\n∈N does not admit a unique solution. To reduce this ambiguity, we consider the moment problem for the sequences \ωb(an)\n∈N, being b∈A and ωb(·):=ω(b*· b). Letting μωb(a) be a solution of the moment problem for the sequence \ωb(an)\n∈N, we introduce a consistency relation on the family \μωb(a)\b∈A. We prove a 1-1 correspondence between consistent families \μωb(a)\b∈A and positive operator-valued measures (POVM) associated with the symmetric operator πω(a). In particular there exists a unique consistent family of \μωb(a)\b∈A if and only if πω(a) is maximally symmetric. This result suggests that a better physical understanding of the notion of observable for general *-algebras should be based on POVMs rather than projection-valued measure (PVM).