AUTHOR=Lien Justin , Kuo Yan-Ning , Ando Hiroyasu , Kido Shoichiro 

TITLE=On cyclostationary linear inverse models: a mathematical insight and implication

JOURNAL=Frontiers in Complex Systems

VOLUME=Volume 3 - 2025

YEAR=2025

URL=https://www.frontiersin.org/journals/complex-systems/articles/10.3389/fcpxs.2025.1563687

DOI=10.3389/fcpxs.2025.1563687

ISSN=2813-6187

ABSTRACT=Cyclostationary linear inverse models (CS-LIMs) are advanced data-driven techniques for extracting first-order time-dependent dynamics and random forcing information from cyclostationary observational data. This study focuses on the mathematical perspective of CS-LIMs and presents two variants, namely, e-CS-LIM and l-CS-LIM. The e-CS-LIM, improved from the original CS-LIM, constructs the first-order dynamics through the interval-wise application of the stationary LIM (ST-LIM), capturing the integrated effect of each interval where similar cyclostationary dependencies are present. This approach provides robustness against noise but is affected by the Nyquist issue, similar to the ST-LIM. The l-CS-LIM, on the other hand, estimates the time-dependent Jacobian of the underlying system. Although more sensitive to noise, this method is free from the Nyquist issue. Numerical experiments demonstrate that both CS-LIM variants effectively capture the temporal structure of the underlying system using synthetic observational data. Moreover, when applied to real-world ENSO data, CS-LIMs yield consistent results that align well with the observations and current El Niño–Southern Oscillation (ENSO) understanding.