maximapunkter

Maximapunkter are points in the domain of a real-valued function where the function value is at a maximum relative to nearby points (local maximum) or relative to all points in the domain (global maximum). The term distinguishes local from global maxima and strict from non-strict maxima. Formally, x0 is a local maximizer if there exists a neighborhood around x0 such that f(x0) ≥ f(x) for all x in that neighborhood; it is a global maximizer if f(x) ≤ f(x0) for all x in the domain.

In one dimension, if the function f is differentiable, local maxima occur at critical points where f'(x0)

In multiple dimensions, a point x0 is a local maximum if the gradient ∇f(x0) = 0 and the

Maximapunkter are central in optimization, economics, physics and statistics. In data analysis, peaks in curves or