On the Kolmogorov--Wiener--Masani spectrum of a multi-mode weakly stationary quantum process

Abstract

We introduce the notion of a k-mode weakly stationary quantum process based on the canonical Schr\"odinger pairs of position and momentum observables in copies of L2(Rk), indexed by an additive abelian group D of countable cardinality. Such observables admit an autocovariance map K from D into the space of real 2k × 2k matrices. The map K on the discrete group D admits a spectral representation as the Fourier transform of a 2k × 2k complex Hermitain matrix-valued totally finite measure on the compact character group D, called the Kolmogorov-Wiener-Masani (KWM) spectrum of the process . Necessary and sufficient conditions on a 2k × 2k complex Hermitian matrix-valued measure on D to be the KWM spectrum of a process are obtained. This enables the construction of examples. Our theorem reveals the dramatic influence of the uncertainty relations among the position and momentum observables on the KWM spectrum of the process . In particular, KWM spectrum cannot admit a gap of positive Haar measure in D. The relationship between the number of photons in a particular mode at any site of the process and its KWM spectrum needs further investigation.