forsinkelsesdifferensialligninger

Forsinkelsesdifferensialligninger, also known as delay differential equations (DDEs), are a type of differential equation where the rate of change of a function depends not only on its current state but also on its past states. This is in contrast to ordinary differential equations (ODEs), where the rate of change depends only on the current state. DDEs are characterized by the presence of a delay term, often denoted as τ, which represents the time lag between the current state and the past state that influences the rate of change.

The general form of a scalar DDE is given by:

dx(t)/dt = f(x(t), x(t-τ), t)

where x(t) is the state variable, f is a function that describes the rate of change, and

DDEs are used to model a wide range of phenomena in various fields, including biology, engineering, economics,

Solving DDEs can be more challenging than solving ODEs due to the presence of the delay term.