posted on 2018-02-19, 16:48authored byJ. Al-Ameri Mohammed, I. Tyukin
We propose a method for deriving computationally efficient representations of periodic solutions of parameterized systems of nonlinear ordinary differential equations. These representations depend on parameters of the system explicitly, as quadratures of parameterized computable functions. The method applies to systems featuring both linear and nonlinear parametrization, and time-varying right-hand-side; it opens possibilities to invoke scalable parallel computations for numerical evaluation of solutions for various parameter values. Application of the method to parameter estimation problems is illustrated with constructing an algorithm for state and parameter estimation for the Morris-Lecar system.
Funding
Ivan Tyukin is thankful to RFBR (research project No. 15-38-20178) for partial support
History
Citation
IFAC-PapersOnLine, 2017, 50 (1), pp. 4001-4007
Author affiliation
/Organisation/COLLEGE OF SCIENCE AND ENGINEERING/Department of Mathematics