NonLipschitzkonturen

NonLipschitzkonturen, also known as non-Lipschitz contours, are a concept in the field of mathematics, particularly in the study of functions and their properties. They refer to the boundaries or contours of a function that do not satisfy the Lipschitz condition. The Lipschitz condition is a mathematical property that describes the behavior of a function, specifically its rate of change. A function is said to be Lipschitz continuous if there exists a constant K such that for all x and y in the domain of the function, the absolute difference of the function values is bounded by K times the absolute difference of the inputs. In other words, the function does not change too rapidly.

NonLipschitzkonturen, on the other hand, are the boundaries or contours where this condition does not hold.