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Main Authors: Akahori, Jiro, Najnudel, Joseph, Wu, Hau-Tieng, Yen, Ju-Yi
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2511.01659
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author Akahori, Jiro
Najnudel, Joseph
Wu, Hau-Tieng
Yen, Ju-Yi
author_facet Akahori, Jiro
Najnudel, Joseph
Wu, Hau-Tieng
Yen, Ju-Yi
contents Phase-rectified signal averaging (PRSA) is a widely used algorithm to analyze nonstationary biomedical time series. The method operates by identifying hinge points in the time series according to prescribed rules, extracting segments centered at these points (with overlap permitted), and then averaging the segments. The resulting output is intended to capture the underlying quasi-oscillatory pattern of the signal, which can subsequently serve as input for further scientific analysis. However, a theoretical analysis of PRSA is lacking. In this paper, we investigate PRSA under two settings. First, when the input consists of a superposition of two oscillatory components, $\cos(2πt)+A\cos(2π(ξt+ϕ))$, where $A>0$, $ξ\in (0,1)$ and $ϕ\in [0,1)$, we show that, asymptotically when the sample size $n\to \infty$, the PRSA output takes the form $A'\sin(2πt)+B'\sin(2πξt)$, where $A',B'\neq 0$. Second, when the input is a stationary Gaussian random process, we establish a central limit theorem: under mild regularity conditions, the averaged vector produced by PRSA converges in distribution to a Gaussian random vector as $n\to \infty$ with mean determined by the covariance structure of the random process. These results indicate that caution is warranted when interpreting PRSA outputs for scientific applications.
format Preprint
id arxiv_https___arxiv_org_abs_2511_01659
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Theoretical analysis of phase-rectified signal averaging (PRSA) algorithm
Akahori, Jiro
Najnudel, Joseph
Wu, Hau-Tieng
Yen, Ju-Yi
Statistics Theory
Phase-rectified signal averaging (PRSA) is a widely used algorithm to analyze nonstationary biomedical time series. The method operates by identifying hinge points in the time series according to prescribed rules, extracting segments centered at these points (with overlap permitted), and then averaging the segments. The resulting output is intended to capture the underlying quasi-oscillatory pattern of the signal, which can subsequently serve as input for further scientific analysis. However, a theoretical analysis of PRSA is lacking. In this paper, we investigate PRSA under two settings. First, when the input consists of a superposition of two oscillatory components, $\cos(2πt)+A\cos(2π(ξt+ϕ))$, where $A>0$, $ξ\in (0,1)$ and $ϕ\in [0,1)$, we show that, asymptotically when the sample size $n\to \infty$, the PRSA output takes the form $A'\sin(2πt)+B'\sin(2πξt)$, where $A',B'\neq 0$. Second, when the input is a stationary Gaussian random process, we establish a central limit theorem: under mild regularity conditions, the averaged vector produced by PRSA converges in distribution to a Gaussian random vector as $n\to \infty$ with mean determined by the covariance structure of the random process. These results indicate that caution is warranted when interpreting PRSA outputs for scientific applications.
title Theoretical analysis of phase-rectified signal averaging (PRSA) algorithm
topic Statistics Theory
url https://arxiv.org/abs/2511.01659