Parameter estimation in systems exhibiting spatially complex solutions via persistent homology and machine learning

Sabrina S. Calcina; Marcio Gameiro

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Parameter estimation in systems exhibiting spatially complex solutions via persistent homology and machine learning

机译：通过持久同源性和机器学习在空间复杂解决方案的系统中参数估计

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摘要

We use persistent homology to extract topological information from complex spatio-temporal data generated by differential equations and use this information to estimate the corresponding parameters of the differential equation using regression methods in machine learning. We apply this technique to a predator-prey system and to the complex Ginzburg-Landau equation.

机译：我们使用持久性同源从差分方程生成的复杂时空数据中提取拓扑信息，并使用该信息使用机器学习中的回归方法来估计微分方程的相应参数。我们将这种技术应用于捕食者 - 猎物系统和复杂的Ginzburg-Landau方程。

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《Mathematics and computers in simulation》 |2021年第7期|719-732|共14页
作者
Sabrina S. Calcina; Marcio Gameiro;
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作者单位

Institute de Ciencias Matematicas e de Computacao Universidade de Sao Paulo Caixa Postal 668 13560-970 Sao Carlos SP Brazil;

Institute de Ciencias Matematicas e de Computacao Universidade de Sao Paulo Caixa Postal 668 13560-970 Sao Carlos SP Brazil;

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正文语种 eng
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关键词
Persistent homology; Persistence diagrams; Parameter estimation; Machine learning; KNeighbors; SVR;

机译：持续同源性;持久性图;参数估计;机器学习;kneighbors;SVR.;

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Parameter estimation in systems exhibiting spatially complex solutions via persistent homology and machine learning

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