For differential equations with state-dependent delays a satisfactory theory is developed by the second author [6] on the solution manifold to guarantee C1 -smoothness for the solution operators. We present examples showing that better than C1 -smoothness cannot be expected in general for the solution manifold and for local stable manifolds at stationary points on the solution manifold. Then we propose a new approach to overcome the diffi culties caused by the lack of smoothness. The mollification technique is used to approximate the nonsmooth evaluation map with smooth maps. Several examples show that the mollified systems can have nicer smoothness properties than the original equation. Examples are also given where better smoothness than ...
We provide a criterion for instability of equilibria of equations in the form $\dot x(t) = g(x_t', x...
Smooth ordinary Delay Differential Equations (DDEs) appear in many applications, including neuroscie...
AbstractIt is shown that in many cases globally defined, bounded solutions of evolution equations ar...
For differential equations with state-dependent delays a satisfactory theory is developed by the sec...
AbstractLet h>0, U⊂C1([−h,0],Rn) open, and f:U→Rn continuously differentiable. If f satisfies two mi...
AbstractFor differential delay equations of the general form x′(t)=g(xt) which include equations wit...
AbstractYu.A. Ryabov and R.D. Driver proved that delay equations with small delays have Lipschitz in...
This work is concerned with efficient numerical methods for computing high order Taylor and Fourier-...
In infinite-dimensional spaces there are non-equivalent notions of continuous differentiability whic...
<p>We consider a non-smooth second order delay differential equation (DDE) that was previously studi...
In systems of stiff Ordinary Differential Equations (ODEs) both fast and slow time scales are encoun...
The objective of this paper is to clarify the relationship between the $C^1$-smooth dependence of so...
Differential equations with state-dependent delays define a semiflow of continuously differentiable ...
AbstractThe space of all solutions for a first-order differential equation can be regarded as a mani...
The method and the formula of variation of constants for ordinary differential equations (ODEs) is a...
We provide a criterion for instability of equilibria of equations in the form $\dot x(t) = g(x_t', x...
Smooth ordinary Delay Differential Equations (DDEs) appear in many applications, including neuroscie...
AbstractIt is shown that in many cases globally defined, bounded solutions of evolution equations ar...
For differential equations with state-dependent delays a satisfactory theory is developed by the sec...
AbstractLet h>0, U⊂C1([−h,0],Rn) open, and f:U→Rn continuously differentiable. If f satisfies two mi...
AbstractFor differential delay equations of the general form x′(t)=g(xt) which include equations wit...
AbstractYu.A. Ryabov and R.D. Driver proved that delay equations with small delays have Lipschitz in...
This work is concerned with efficient numerical methods for computing high order Taylor and Fourier-...
In infinite-dimensional spaces there are non-equivalent notions of continuous differentiability whic...
<p>We consider a non-smooth second order delay differential equation (DDE) that was previously studi...
In systems of stiff Ordinary Differential Equations (ODEs) both fast and slow time scales are encoun...
The objective of this paper is to clarify the relationship between the $C^1$-smooth dependence of so...
Differential equations with state-dependent delays define a semiflow of continuously differentiable ...
AbstractThe space of all solutions for a first-order differential equation can be regarded as a mani...
The method and the formula of variation of constants for ordinary differential equations (ODEs) is a...
We provide a criterion for instability of equilibria of equations in the form $\dot x(t) = g(x_t', x...
Smooth ordinary Delay Differential Equations (DDEs) appear in many applications, including neuroscie...
AbstractIt is shown that in many cases globally defined, bounded solutions of evolution equations ar...