Definition:
Remark 2: An extremum is locally defined.
Remark 3: An extremum at the boundary of the domain is called a boundary extremum.
Remark 4: Minimum en maximum are non-strictly defined. (See Monotonicity.)
- A function value $y(c)$ is a minimum of the function $y(x)$ if for each $x$ in the neighborhood of $c$ \[y(x)\geq y(c).\] The point $c$ is called a minimum location of the function $y(x)$.
- A function value $y(c)$ is a maximum of the function $y(x)$ if for each $x$ in the neighborhood of $c$ \[y(x)\leq y(c).\] The point $c$ is called a maximum location of the function $y(x)$.
Remark 2: An extremum is locally defined.
Remark 3: An extremum at the boundary of the domain is called a boundary extremum.
Remark 4: Minimum en maximum are non-strictly defined. (See Monotonicity.)