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Identification of nonlinear dynamical system equations using dynamic mode decomposition under invariant quantity constraints |
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| Authors: | Florian De Vuyst Pierre Villon |
| Institution: | 1. Laboratoire de mathématiques appliquées de Compiègne, EA 2222, Université de technologie de Compiègne, Alliance Sorbonne Université, 60200 Compiègne, France;2. Laboratoire Roberval, FRE UTC–CNRS, Université de technologie de Compiègne, Alliance Sorbonne Université, 60200 Compiègne, France |
| Abstract: | In this paper, an algorithm for identifying equations representing a continuous nonlinear dynamical system from a noise-free state and time-derivative state measurements is proposed. It is based on a variant of the extended dynamic mode decomposition. A particular attention is paid to guarantee that the physical invariant quantities stay constant along the integral curves. The numerical methodology is validated on a two-dimensional Lotka–Volterra system. For this case, the differential equations are perfectly retrieved from data measurements. Perspectives of extension to more complex systems are discussed. |
| Keywords: | Corresponding author Dynamical system Identification Invariant quantity Symplectic Dynamic mode decomposition Lyapunov equations Lotka–Volterra system |
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