For neutral delay differential equations the right-hand side can be multi-valued, when one or several delayed arguments cross a breaking point. This article studies a regularization via a singularly perturbed problem, which smooths the vector field and removes the discontinuities in the derivative of the solution. A low-dimensional dynamical system is presented, which characterizes the kind of generalized solution that is approximated. For the case that the solution of the regularized problem has high frequency oscillations around a codimension-2 weak solution of the original problem, a new stabilizing regularization is proposed and analyzed
© 2017 We present an approach that allows to reduce a system of delay differential-algebraic equatio...
AbstractIn this paper we consider a class of neutral delay differential equations with state depende...
Conditions are investigated which guarantee that Runge-Kutta methods preserve the asymptotic values ...
Regularization of neutral delay differential equations with several delays GUGLIELMI, Nicola, HAIRER...
Singularly perturbed delay differential equations arising from the regularization of state dependent...
Proceeding of: 16th Conference of the European Consortium for Mathematics in Industry (ECMI 2010), W...
We provide a criterion for instability of equilibria of equations in the form $\dot x(t) = g(x_t', x...
We present a method to compute efficiently and easily solutions of systems of linear neutral delay d...
Based on A-stable one-leg methods and linear interpolations, we introduce four algorithms for solvin...
This paper analyzes the delay-dependent stability of a class of neutral differential systems, and co...
We introduce two collocation schemes for the computation of periodic solutions of neutral delay diff...
The stability of a delay differential equation can be investigated on the basis of the root location...
The stability theory for linear neutral equations subjected to delay perturbations is addressed. It ...
AbstractWe derive two estimations of numerically stable step-size for systems of neutral delay diffe...
As well known, solutions of delay differential equations (DDEs) are characterizes by low regularity....
© 2017 We present an approach that allows to reduce a system of delay differential-algebraic equatio...
AbstractIn this paper we consider a class of neutral delay differential equations with state depende...
Conditions are investigated which guarantee that Runge-Kutta methods preserve the asymptotic values ...
Regularization of neutral delay differential equations with several delays GUGLIELMI, Nicola, HAIRER...
Singularly perturbed delay differential equations arising from the regularization of state dependent...
Proceeding of: 16th Conference of the European Consortium for Mathematics in Industry (ECMI 2010), W...
We provide a criterion for instability of equilibria of equations in the form $\dot x(t) = g(x_t', x...
We present a method to compute efficiently and easily solutions of systems of linear neutral delay d...
Based on A-stable one-leg methods and linear interpolations, we introduce four algorithms for solvin...
This paper analyzes the delay-dependent stability of a class of neutral differential systems, and co...
We introduce two collocation schemes for the computation of periodic solutions of neutral delay diff...
The stability of a delay differential equation can be investigated on the basis of the root location...
The stability theory for linear neutral equations subjected to delay perturbations is addressed. It ...
AbstractWe derive two estimations of numerically stable step-size for systems of neutral delay diffe...
As well known, solutions of delay differential equations (DDEs) are characterizes by low regularity....
© 2017 We present an approach that allows to reduce a system of delay differential-algebraic equatio...
AbstractIn this paper we consider a class of neutral delay differential equations with state depende...
Conditions are investigated which guarantee that Runge-Kutta methods preserve the asymptotic values ...