Path-regularization of linear neutral delay differential equations with several delays
From MaRDI portal
Publication:495113
DOI10.1016/J.CAM.2014.12.028zbMath1343.34153OpenAlexW2054720239MaRDI QIDQ495113
Ernst Hairer, Nicola Guglielmi
Publication date: 9 September 2015
Published in: Journal of Computational and Applied Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.cam.2014.12.028
stabilityweak solutionsdiscontinuous differential equationsneutral delay equationspath-regularization
Linear functional-differential equations (34K06) Neutral functional-differential equations (34K40) Singular perturbations of functional-differential equations (34K26)
Related Items (2)
Global exponential stability for multi-group neutral delayed systems based on Razumikhin method and graph theory ⋮ Distance computation of ontology vector for ontology similarity measuring and ontology mapping
Cites Work
- Unnamed Item
- Unnamed Item
- A regularization for discontinuous differential equations with application to state-dependent delay differential equations of neutral type
- A Filippov sliding vector field on an attracting co-dimension 2 discontinuity surface, and a limited loss-of-attractivity analysis
- Regularization of neutral delay differential equations with several delays
- Regularizing piecewise smooth differential systems: co-dimension 2 discontinuity surface
- Numerical approaches for state-dependent neutral delay equations with discontinuities
- Non-Filippov dynamics arising from the smoothing of nonsmooth systems, and its robustness to noise
- Piecewise-smooth dynamical systems. Theory and applications
- Sliding motion on discontinuity surfaces of high co-dimension. A construction for selecting a Filippov vector field
- Hidden dynamics in models of discontinuity and switching
- Regularization of discontinuous vector fields on \({\mathbb{R}^3}\) via singular perturbation
- Asymptotic Expansions for Regularized State-Dependent Neutral Delay Equations
- Sliding Motion in Filippov Differential Systems: Theoretical Results and a Computational Approach
This page was built for publication: Path-regularization of linear neutral delay differential equations with several delays
