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Abstract:
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Many real-world atmospheric, ecological, and economic processes are governed by complex, non-linear, interactions, and differential equations are commonly used to approximate the dynamics of these complex systems. While the approximating differential equations generally capture the dynamics of the system well, they impose a rigid modeling structure that assumes the dynamics of the system. Recently, there has been work in the applied math and computer science community to use a data-driven approach to learn the dynamics that govern complex systems. Here, we present a Bayesian data-driven approach to non-linear dynamic equation discovery that is robust to measurement noise and stochastic forcing. We show the effectiveness of our method on simulated systems and then apply the method to a real-world environmental process.
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