Nonlinear power spectral densities for the harmonic oscillator

Abstract: In this paper, we discuss a general procedure by which nonlinear power spectral densities (PSDs) of the harmonic oscillator can be calculated in both the quantum and classical regimes. We begin with an introduction of the damped and undamped classical harmonic oscillator, followed by an overview of the quantum mechanical description of this system. A brief review of both the classical and quantum autocorrelation functions (ACFs) and PSDs follow. We then introduce a general method by which the kth-order PSD for… Show more

“…As shown in the Supplementary information and Refs. [15,33], S x 2 (ω) of a resonator in an phonon number thermal state is…”

Nonlinear optomechanical paddle nanocavities

“…As shown in the Supplementary information and Refs. [15,33], S x 2 (ω) of a resonator in an phonon number thermal state is…”

Nonlinear optomechanical paddle nanocavities

“…Comparing Eq. (B32) to the expected expression for the mean-squared displacement of the resonator, x 2 = 2x zpf n + 1 2 [65], we determine the average phonon occupancy n of a mechanical resonator subject to both photothermal and radiation pressure optomechanical forces to be n =…”

Dueling dynamical backaction in a cryogenic optomechanical cavity

“…Long range dependence (LRD) of a process can be defined by an asymptotic power-law decrease of its autocorrelation function (ACF) and power spectral density (PSD) [28]. Let X " px t : t " 1, 2, 3...q be a stochastic process with the ACF r xx pτq " Erxptqxpt`τqs, then X is called SRD series if r xx pτq is integrable [16,29], that is ş 8 0 r xx pτqdτ ă 8, on the other side, X is LRD if r xx pτq is nonintegrable, that is ş 8 0 r xx pτqdτ " 8.…”

Long Range Dependence Prognostics for Bearing Vibration Intensity Chaotic Time Series