LipschitzFunktionen

Lipschitzfunktionen, also known as Lipschitz-stetige Funktionen, are a class of functions in mathematical analysis that possess a specific type of uniform continuity. A function f defined on a subset D of a metric space is said to be Lipschitz continuous if there exists a non-negative real number K, called the Lipschitz constant, such that for all x and y in D, the inequality |f(x) - f(y)| <= K|x - y| holds. This condition implies that the rate of change of the function is bounded.

The Lipschitz constant K provides an upper bound on the absolute value of the slope of the

Lipschitz continuity has important implications in various fields of mathematics. For instance, it plays a crucial