Least-squares solutions of boundary-value problems in hybrid systems
From MaRDI portal
Publication:2020581
DOI10.1016/j.cam.2021.113524zbMath1471.65087arXiv1911.04390OpenAlexW2988538102MaRDI QIDQ2020581
Daniele Mortari, Hunter Johnston
Publication date: 23 April 2021
Published in: Journal of Computational and Applied Mathematics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1911.04390
hybrid systemsleast-squaresembedded linear constraintstheory of functional connectionsfunctional interpolation
Related Items
A neural networks-based numerical method for the generalized Caputo-type fractional differential equations, Analysis of Timoshenko-Ehrenfest beam problems using the theory of functional connections, Theory of functional connections applied to quadratic and nonlinear programming under equality constraints, Analysis of nonlinear Timoshenko-Ehrenfest beam problems with von Kármán nonlinearity using the theory of functional connections
Uses Software
Cites Work
- Unnamed Item
- Unnamed Item
- Global error estimates for the standard parallel shooting method
- Estimation of the global discretization error in shooting methods for linear boundary value problems
- Least-squares solution of linear differential equations
- The theory of connections: connecting points
- High accuracy least-squares solutions of nonlinear differential equations
- Replacing the finite difference methods for nonlinear two-point boundary value problems by successive application of the linear shooting method
- Advances in variable structure and sliding mode control. Many papers based on the expansions of selected presentations from the 8th IEEE international workshop on variable structure systems (VSS'04), Barcelona, Spain, September 2004.
- On shooting methods for boundary value problems
- Multiple shooting method for two-point boundary value problems
- A shooting method for solving two-point boundary-value problems arising from non-singular bang-bang optimal control problems
- The convergence of shooting methods
- Chebyshev Collocation Methods for Ordinary Differential Equations
