On the simplest system with retarding switching and 2-point critical set.- Functional Differential Equations

Abstract: The system considered in this paper consists of two equations $(k=1,2)$ $\dot x(t)=(-1)^{k-1} (0\le t<\infty),\,k(0)=1,\,x(0)=0,\,x(t)\not\in{0,1}(-1\le t<0),$ that change mutually in every instant $t$ for which $x(t-\tau)\in{0,1}$, where $\tau={\rm const}>0$ is given. In this paper the behavior of the solutions is characterized for every $\tau\in(4/3, 3/2)$, i. e. in case not covered in \cite{ADM}; as it was noted there, this behavior turned out to be more complex then when $\tau\in(3/2,\infty)$. Thus the behavior of the solutions of this system with critical set $K={0,1}$ is characterized for every $\tau>0$.