driftsfunktion

Driftsfunktion, or drift function in English, is a mathematical concept used to describe the deterministic part of the evolution of a system modeled by stochastic or dynamical equations. It specifies the expected instantaneous change of the state variable, separating predictable trends from random fluctuations.

In continuous-time stochastic processes, the drift function μ governs the deterministic trend in a diffusion process. A

In deterministic dynamical systems, the drift corresponds to the vector field f(x, t) in the ordinary differential

Examples include the Ornstein–Uhlenbeck process with μ(x) = −θ x, illustrating a restoring drift toward zero, and geometric

Properties relevant to drifts include regularity conditions (such as Lipschitz continuity and linear growth) that ensure

See also: stochastic differential equation, Itô calculus, diffusion process, drift coefficient.