Ulam’s type stability of impulsive ordinary differential equations
Copyright policy )Ulam’s type stability of impulsive ordinary differential equations
The authors consider the following impulsive differential equations \[ x'(t)= f(t,x(t)),\quad t\in J':= J\setminus\{t_1,\dotsc, t_m\},\quad J:= [0,T],\;T> 0, \] \[ \Delta x(t_k)= I_k(x(t^-_k)),\quad k= 1,2,\dotsc, m, \] where \(f: J\times\mathbb{R}\to \mathbb{R}\) is continuous, \(I_k: \mathbb{R}\to \mathbb{R}\), \(T< \infty\), and \[ x(t^+_k)= \lim_{\varepsilon\to 0^+} x(t_k+\varepsilon)\quad\text{and} \quad x(t^-_k)= \lim_{\varepsilon\to 0^-} x(t_k+ \varepsilon). \] The authors introduce four types of Ulam's stability and find sufficient conditions for them.
- Guizhou University China (People's Republic of)
- Slovak Academy of Science Slovakia
- Comenius University Slovakia
- Slovak Academy of Sciences Slovakia
- Xiangtan University China (People's Republic of)
Impulsive ordinary differential equations, impulse ordinary differential equations with fixed impulse points, Applied Mathematics, Ulam's type stability, Perturbations of ordinary differential equations, Ordinary differential equations with impulses, Ulam’s type stability, Analysis
Impulsive ordinary differential equations, impulse ordinary differential equations with fixed impulse points, Applied Mathematics, Ulam's type stability, Perturbations of ordinary differential equations, Ordinary differential equations with impulses, Ulam’s type stability, Analysis
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