Signed Graph Neural Ordinary Differential Equation for Modeling Continuous-time Dynamics
This work solves the issue of accurately capturing real-world signed interactions in dynamic systems for applications like physics, biology, and traffic modeling, representing an incremental advance by integrating signed information into existing frameworks.
The paper tackles the problem of modeling continuous-time dynamics by addressing the neglect of signed information in graph neural ODEs, resulting in substantial performance improvements over three baseline frameworks across physics, biology, and traffic datasets.
Modeling continuous-time dynamics constitutes a foundational challenge, and uncovering inter-component correlations within complex systems holds promise for enhancing the efficacy of dynamic modeling. The prevailing approach of integrating graph neural networks with ordinary differential equations has demonstrated promising performance. However, they disregard the crucial signed information intrinsic to graphs, impeding their capacity to accurately capture real-world phenomena and leading to subpar outcomes. In response, we introduce a novel approach: a signed graph neural ordinary differential equation, adeptly addressing the limitations of miscapturing signed information. Our proposed solution boasts both flexibility and efficiency. To substantiate its effectiveness, we seamlessly integrate our devised strategies into three preeminent graph-based dynamic modeling frameworks: graph neural ordinary differential equations, graph neural controlled differential equations, and graph recurrent neural networks. Rigorous assessments encompass three intricate dynamic scenarios from physics and biology, as well as scrutiny across four authentic real-world traffic datasets. Remarkably outperforming the trio of baselines, empirical results underscore the substantial performance enhancements facilitated by our proposed approach.Our code can be found at https://github.com/beautyonce/SGODE.