Rethinking Channel Dependence for Multivariate Time Series Forecasting: Learning from Leading Indicators
Keskeiset käsitteet
Exploiting locally stationary lead-lag relationships between variates improves multivariate time series forecasting accuracy.
Tiivistelmä
Introduction
Multivariate time series (MTS) forecasting is crucial in various domains like weather, traffic, and finance.
Traditional channel-dependent (CD) methods are being outperformed by channel-independent (CI) methods.
Locally Stationary Lead-Lag Relationships
Variates exhibit lead-lag relationships where some lagged variates follow leading indicators within a short period.
Exploiting this channel dependence can reduce forecasting difficulty by utilizing advance information.
LIFT Approach
LIFT method estimates leading indicators and their steps, aligns variates with leading indicators, and refines predictions using a Lead-aware Refiner.
Lightweight MTS Forecasting with LIFT
LightMTS, a lightweight method using LIFT, shows competitive performance compared to complex models.
Experiments
LIFT outperforms state-of-the-art CI and CD models on various datasets, improving average forecasting performance by 5.5%.
Ablation Study
Removing influence or difference terms in LightMTS leads to inferior performance, highlighting the importance of considering both lead-lag relationships.
Hyperparameter Study
Increasing the number of selected leading indicators generally improves performance but may introduce noise with excessively large values.
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arxiv.org
Rethinking Channel Dependence for Multivariate Time Series Forecasting
Tilastot
Extensive experiments on six real-world datasets demonstrate that LIFT improves the state-of-the-art methods by 5.5% in average forecasting performance.
How can the concept of locally stationary lead-lag relationships be applied to other fields beyond time series forecasting
The concept of locally stationary lead-lag relationships can be applied to various fields beyond time series forecasting. In finance, for example, understanding the lead-lag relationships between different financial instruments or markets can help in predicting market movements and making informed investment decisions. In healthcare, analyzing the lead-lag patterns between symptoms and diseases could aid in early diagnosis and treatment planning. Additionally, in supply chain management, identifying lead indicators for demand fluctuations can optimize inventory management and production scheduling.
What potential drawbacks or limitations might arise from relying too heavily on leading indicators for forecasting
Relying too heavily on leading indicators for forecasting may have several drawbacks or limitations. One potential issue is the risk of overfitting to specific patterns observed in historical data that may not hold true in future scenarios. If the leading indicators change abruptly or exhibit unexpected behavior, it could result in inaccurate forecasts. Moreover, excessive reliance on leading indicators might overlook important contextual information or causal factors that influence the outcomes being forecasted, leading to biased predictions.
How might understanding variate states impact the effectiveness of modeling channel dependence in time series forecasting
Understanding variate states plays a crucial role in modeling channel dependence effectively in time series forecasting. Variate states provide valuable insights into how different variables interact with each other over time based on their intrinsic characteristics or external influences. By incorporating variate states into the modeling process, one can capture dynamic changes in relationships between variates more accurately and adaptively adjust forecasting strategies based on these changing dynamics. This approach enhances the model's ability to account for shifts in channel dependencies and improve forecast accuracy under varying conditions.
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Sisällysluettelo
Rethinking Channel Dependence for Multivariate Time Series Forecasting: Learning from Leading Indicators
Rethinking Channel Dependence for Multivariate Time Series Forecasting
How can the concept of locally stationary lead-lag relationships be applied to other fields beyond time series forecasting
What potential drawbacks or limitations might arise from relying too heavily on leading indicators for forecasting
How might understanding variate states impact the effectiveness of modeling channel dependence in time series forecasting