Bridging Koopman Operator and time-series auto-correlation based Hilbert-Schmidt operator

Abstract

Given a stationary continuous-time process f(t), the Hilbert-Schmidt operator Aτ can be defined for every finite τVautard1989SingularSA. Let λτ,i be the eigenvalues of Aτ with descending order. In this article, a Hilbert space Hf and the (time-shift) continuous one-parameter semigroup of isometries Ks are defined. Let \vi, i∈N\ be the eigenvectors of Ks for all s≥ 0. Let f = Σi=1∞aivi + f be the orthogonal decomposition with descending |ai|. We prove that τ∞λτ,i = |ai|2. The continuous one-parameter semigroup \Ks: s≥ 0\ is equivalent, almost surely, to the classical Koopman one-parameter semigroup defined on L2(X,), if the dynamical system is ergodic and has invariant measure on the phase space X.