Enveloping spectral surfaces: covariate dependent spectral analysis of categorical time series

• Published in: Journal of time series analysis Vol. 33; no. 5; pp. 797 - 806
• Main Authors: Krafty, Robert T., Xiong, Shuangyan, Stoffer, David S., Buysse, Daniel J., Hall, Martica
• Format: Journal Article
• Language: English
• Published: Oxford, UK Blackwell Publishing Ltd 01.09.2012
• Subjects: Biology; Circadian Biology; Circadian rhythm; Covariance; Data envelopment analysis; Methodology; optimal scaling; Qualitative analysis; qualitative time series; Sleep disorders; Sleep Medicine; spectral analysis; spectral envelope; Spectrum analysis; Studies; Time series; Spectral Analysis; Optimal Scaling; Circadian Biology; Qualitative Time Series; Sleep Medicine; Spectral Envelope
• ISSN: 0143-9782; 1467-9892
• DOI: 10.1111/j.1467-9892.2011.00773.x

Motivated by problems in Sleep Medicine and Circadian Biology, we present a method for the analysis of cross‐sectional categorical time series collected from multiple subjects where the effect of static continuous‐valued covariates is of interest. Towards this goal, we extend the spectral envelope methodology for the frequency domain analysis of a single categorical process to cross‐sectional categorical processes that are possibly covariate dependent. The analysis introduces an enveloping spectral surface for describing the association between the frequency domain properties of qualitative time series and covariates. The resulting surface offers an intuitively interpretable measure of association between covariates and a qualitative time series by finding the maximum possible conditional power at a given frequency from scalings of the qualitative time series conditional on the covariates. The optimal scalings that maximize the power provide scientific insight by identifying the aspects of the qualitative series which have the most pronounced periodic features at a given frequency conditional on the value of the covariates. To facilitate the assessment of the dependence of the enveloping spectral surface on the covariates, we include a theory for analysing the partial derivatives of the surface. Our approach is entirely non‐parametric, and we present estimation and asymptotics in the setting of local polynomial smoothing.