Abstract
The concept of time-correlated noise is important to applied stochastic modelling. Nevertheless, there is no generally agreed-upon definition of the term red noise in continuous-time stochastic modelling settings. We present here a rigorous argumentation for the Ornstein-Uhlenbeck process integrated against time ( Utdt ) as a uniquely appropriate red noise implementation. We also identify the term dUt as an erroneous formulation of red noise commonly found in the applied literature. To this end, we prove a theorem linking properties of the power spectral density (PSD) to classes of Itô-differentials. The commonly ascribed red noise attribute of a PSD decaying as S(ω) ∼ ω-2 restricts the range of possible Itô-differentials dYt = αtdt + βtdWt . In particular, any such differential with continuous, square-integrable integrands must have a vanishing martingale part, i.e. dYt = αtdt for almost all t ≥ 0 . We further point out that taking (αt)t≥0 to be an Ornstein-Uhlenbeck process constitutes a uniquely relevant model choice due to its Gauss-Markov property. The erroneous use of the noise term dUt as red noise and its consequences are discussed in two examples from the literature.