Stationarity Exploration for Multivariate Time Series Forecasting
- URL: http://arxiv.org/abs/2508.08919v1
- Date: Tue, 12 Aug 2025 13:15:51 GMT
- Title: Stationarity Exploration for Multivariate Time Series Forecasting
- Authors: Hao Liu, Chun Yang, Zhang xiaoxing, Rui Ma, Xiaobin Zhu,
- Abstract summary: We propose a simple yet effective Amplitude-Phase Reconstruct Network (APRNet)<n>APRNet models the inter-relationships of amplitude and phase, which prevents the amplitude and phase from being constrained by different physical quantities.<n>We propose a novel Kolmogorov-Arnold-Network-based Local Correlation (KLC) module to adaptively fit local functions.
- Score: 16.66747488602513
- License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
- Abstract: Deep learning-based time series forecasting has found widespread applications. Recently, converting time series data into the frequency domain for forecasting has become popular for accurately exploring periodic patterns. However, existing methods often cannot effectively explore stationary information from complex intertwined frequency components. In this paper, we propose a simple yet effective Amplitude-Phase Reconstruct Network (APRNet) that models the inter-relationships of amplitude and phase, which prevents the amplitude and phase from being constrained by different physical quantities, thereby decoupling the distinct characteristics of signals for capturing stationary information. Specifically, we represent the multivariate time series input across sequence and channel dimensions, highlighting the correlation between amplitude and phase at multiple interaction frequencies. We propose a novel Kolmogorov-Arnold-Network-based Local Correlation (KLC) module to adaptively fit local functions using univariate functions, enabling more flexible characterization of stationary features across different amplitudes and phases. This significantly enhances the model's capability to capture time-varying patterns. Extensive experiments demonstrate the superiority of our APRNet against the state-of-the-arts (SOTAs).
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