Positive Definite Sequence of Operators and a Fixed Point Theorem

Extract

The purpose of this note is to prove the following:

Theorem. Let {A_n} be a positive definite sequence of operators on a Hilbert space H with A₀=1. If A₁f=f for some f in H, then A_nf=f for all n.

Note that a bilateral sequence of operators {A_n:n = 0, ±1, ±2,…} on H is positive definite if

for every finitely nonzero sequence {f_n} of vectors in H [1].