Analyticity and Nonanalyticity of Solutions of Delay-Differential Equations

We consider the equation $\dot x(t)=f(t,x(t),x(\eta(t)))$ with a variable time shift $\eta(t)$. Both the nonlinearity $f$ and the shift function $\eta$ are given, and are assumed to be analytic (that is, holomorphic) functions of their arguments. Typically the time shift represents a delay, namely, that $\eta(t)=t-r(t)$ with $r(t)\ge 0$. The main problem considered is to determine when solutions (generally $C^\infty$ and often periodic solutions) of the differential equation are analytic functions of $t$; and more precisely, to determine for a given solution at which values of $t$ it is analytic, and at which values it is not analytic. Both sufficient conditions for analyticity, and also for nonanalyticity, at certain values of $t$ are obtained. It is shown that for some equations there exists a solution which is $C^\infty$ everywhere, and is analytic at certain values of $t$ but is not analytic at other values of $t$. Throughout our analysis, the dynamic properties of the map $t\to\eta(t)$ play a crucial...