Proper convex function

It has been suggested that this article be merged into Convex function. (Discuss) Proposed since March 2011.

In mathematical analysis (in particular convex analysis) and optimization, a proper convex function is a convex function f taking values in the extended real number line such that

${\displaystyle f(x)<+\infty }$

for at least one x and

${\displaystyle f(x)>-\infty }$

for every x. That is, a convex function is proper if its effective domain is nonempty and it never attains ${\displaystyle -\infty }$.^[1] Convex functions that are not proper are called improper convex functions.^[2]

A proper concave function is any function g such that ${\displaystyle f=-g}$ is a proper convex function.

For every proper convex function f on Rⁿ there exist some b in Rⁿ and β in R such that

${\displaystyle f(x)\geq x\cdot b-\beta }$

for every x.^{[citation needed]}

The sum of two proper convex functions is not necessarily proper or convex. For instance if the sets ${\displaystyle A}$ and ${\displaystyle B}$ are disjoint convex sets, then the indicator functions ${\displaystyle I_{A}}$ and ${\displaystyle I_{B}}$ are proper convex functions, but ${\displaystyle I_{A}+I_{B}}$ is not convex (unless ${\displaystyle A\cup B}$ is convex), and is possibly identically equal to ${\displaystyle +\infty }$ if ${\displaystyle A}$ and ${\displaystyle B}$ are complimenatry halfspaces.

The infimal convolution of two proper convex functions is convex but not necessarily proper convex.^{[citation needed]}