Minima and maxima
Jump to navigation
Jump to search
In mathematics, minima and maxima, known collectively as extrema, are the or smallest value (minimum) largest value (maximuml), that a function takes in a point either within a given neighbourhood (local extremum) or on the whole function domain (global extremum).
Definition
Minimum
A real-valued function f is said to have a local minimum at the point x*, if there exists some ε > 0, such that f(x*) ≤ f(x) whenever |x − x*| < ε. The value of the function at this point is called minimum of the function.
Definition of a local maximum is similar, only with the ≥ sign in place of ≤.