Identification of affine dynamical systems from a single trajectory
Article Properties
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DOI (url)
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Publication Date2020/08/01
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Journal
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Indian UGC (journal)
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Refrences45
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Citations3
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X Duan ORCID (unauthenticated)
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J E Rubin ORCID (unauthenticated)
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D Swigon
Cite
Duan, X, et al. “Identification of Affine Dynamical Systems from a Single Trajectory”. Inverse Problems, vol. 36, no. 8, 2020, p. 085004, https://doi.org/10.1088/1361-6420/ab958e.
Duan, X., Rubin, J. E., & Swigon, D. (2020). Identification of affine dynamical systems from a single trajectory. Inverse Problems, 36(8), 085004. https://doi.org/10.1088/1361-6420/ab958e
Duan, X, J E Rubin, and D Swigon. “Identification of Affine Dynamical Systems from a Single Trajectory”. Inverse Problems 36, no. 8 (2020): 085004. https://doi.org/10.1088/1361-6420/ab958e.
Duan X, Rubin JE, Swigon D. Identification of affine dynamical systems from a single trajectory. Inverse Problems. 2020;36(8):085004.
Journal Categories
Science
Mathematics
Science
Physics
Technology
Technology (General)
Industrial engineering
Management engineering
Applied mathematics
Quantitative methods
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Refrences
| Title | Journal | Journal Categories | Citations | Publication Date |
|---|---|---|---|---|
| 10.1109/CDC.2006.376925 | 2006 | |||
| 10.1109/CDC.2006.376925 | 2013 | |||
| 10.1109/CDC.2006.376925 | 1965 | |||
| 10.1109/CDC.2006.376925 | 2018 | |||
| 10.1109/CDC.2006.376925 | 2006 |
Citations
| Title | Journal | Journal Categories | Citations | Publication Date |
|---|---|---|---|---|
| Rigorous Mapping of Data to Qualitative Properties of Parameter Values and Dynamics: A Case Study on a Two-Variable Lotka–Volterra System | Bulletin of Mathematical Biology |
| 2023 | |
Qualitative inverse problems: mapping data to the features of trajectories and parameter values of an ODE model | Inverse Problems |
| 1 | 2023 |
Estimate the spectrum of affine dynamical systems from partial observations of a single trajectory data | Inverse Problems |
| 2 | 2021 |
Citations Analysis
The category
Science: Mathematics 3
is the most commonly referenced area in studies that cite this article. The first research to cite this article was titled Estimate the spectrum of affine dynamical systems from partial observations of a single trajectory data and was published in 2021. The most recent citation comes from a 2023 study titled Rigorous Mapping of Data to Qualitative Properties of Parameter Values and Dynamics: A Case Study on a Two-Variable Lotka–Volterra System. This article reached its peak citation in 2023, with 2 citations. It has been cited in 2 different journals. Among related journals, the Inverse Problems cited this research the most, with 2 citations. The chart below illustrates the annual citation trends for this article.