Delay differential equation

Definition

The notion of delay differential equation (abbreviated DDE) is a variant of the notion of differential equation (in other words, delay differential equations are not (ordinary) differential equations). If we denote the dependent variable by ${\displaystyle x}$ and the independent variable by ${\displaystyle t}$ (Which we think of as time), the first-order first-degree case is:

${\displaystyle \frac{dx(t)}{dt}}=f(t,x(t),\text{the entire trajectory of }x\text{ prior to time }t)$

The delay differential equations that we study are typically autonomous delay differential equations: the nature of the expression for ${\displaystyle d(x(t))/dt}$ is invariant under translation of ${\displaystyle t}$ by any constant.