Linganisha mbinu
Pitia mbinu ulizochagua bega kwa bega; safu zinazotofautiana zinaangaziwa.
| Koopa: Viunzi vya Koopman kwa Mihimili ya Wakati Isiyo Imara× | DLinear: Muundo Linganifu wa Mfumo wa Mielekeo kwa Utabiri wa Mfuatano wa Wakati× | Non-stationary Transformer× | Mfumo wa Nafasi ya Hali (Kichujio cha Kalman)× | |
|---|---|---|---|---|
| Nyanja≠ | Ujifunzaji wa Kina | Ujifunzaji wa Kina | Ujifunzaji wa Kina | Ekonometriki |
| Familia≠ | Machine learning | Machine learning | Machine learning | Regression model |
| Mwaka wa asili≠ | 2023 | 2023 | 2022 | 1990 |
| Mwanzilishi≠ | Yong Liu et al. | Ailing Zeng et al. | Yong Liu et al. | Harvey; Durbin & Koopman (state space treatment); Kalman filter |
| Aina≠ | Koopman operator-based time-series forecasting model | Decomposition-based linear forecasting model | Transformer-based time-series forecasting model | State space time series model |
| Chanzo asilia≠ | Liu, Y., Li, C., Wang, J., & Long, M. (2023). Koopa: Learning non-stationary time series dynamics with Koopman predictors. NeurIPS. link ↗ | Zeng, A., Chen, M., Zhang, L., & Xu, Q. (2023). Are transformers effective for time series forecasting? AAAI. link ↗ | Liu, Y., Wu, H., Wang, J., & Long, M. (2022). Non-stationary transformers: Exploring the stationarity in time series forecasting. NeurIPS. link ↗ | Harvey, A. C. (1990). Forecasting, Structural Time Series Models and the Kalman Filter. Cambridge University Press. DOI ↗ |
| Majina mbadala | Koopman Predictor, Koopman-based Time-Series Model, Koopa Forecaster, Koopman Tahmincisi | Decomposition Linear, DLinear Forecaster, Linear Decomposition Model, Ayrışım Doğrusal Modeli | NS-Transformer, Non-stationary Transformer Network, Stationarization-based Transformer, Durağan-Olmayan Transformer | state space, Kalman filter, unobserved components model, Durum Uzayı Modeli (State Space / Kalman Filter) |
| Zinazohusiana≠ | 3 | 3 | 3 | 4 |
| Muhtasari≠ | Koopa is a deep learning model for time-series forecasting introduced by Yong Liu, Chang Li, Jianmin Wang, and Mingsheng Long at NeurIPS 2023. It addresses the challenge of non-stationarity by disentangling time series into stationary and non-stationary components, then modeling the non-stationary dynamics using a learned approximation of the Koopman operator — a mathematical framework that lifts nonlinear systems into a linear space for tractable long-horizon prediction. | DLinear is a lightweight time series forecasting model introduced by Zeng et al. at AAAI 2023. It challenges the prevailing assumption that Transformer-based architectures are necessary for accurate long-horizon forecasting. The model decomposes an input sequence into trend and seasonal components using a moving average filter, then applies separate single-layer linear transformations to each component before summing their outputs to produce the final forecast. | Non-stationary Transformer is a Transformer-based time-series forecasting architecture introduced by Yong Liu, Haixu Wu, Jianmin Wang, and Mingsheng Long at NeurIPS 2022. It addresses a fundamental tension in applying Transformers to real-world time series: over-stationarization during preprocessing strips out non-stationary signals that carry predictive information, while raw non-stationary inputs cause attention to collapse. The model resolves this through series stationarization paired with a novel de-stationary attention mechanism that restores the original temporal distribution in predictions. | A state space model is a general time series framework that describes a series through unobserved (latent) state variables linked by a measurement equation and a transition equation, with the states estimated in real time by the Kalman filter. Developed in the state space tradition of Harvey (1990) and Durbin & Koopman (2012), it nests ARIMA and exponential smoothing as special cases. |
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