Definition:Concave Real Function

This page is about concave real function. For other uses, see concave.

Definition

Let $f$ be a real function which is defined on a real interval $I$.

Definition 1

$f$ is concave on $I$ if and only if:

$\forall x, y \in I: \forall \alpha, \beta \in \R_{>0}, \alpha + \beta = 1: \map f {\alpha x + \beta y} \ge \alpha \map f x + \beta \map f y$

Definition 2

$f$ is concave on $I$ if and only if:

$\ds \forall x_1, x_2, x_3 \in I: x_1 < x_2< x_3: \frac {\map f {x_2} - \map f {x_1} } {x_2 - x_1} \ge \frac {\map f {x_3} - \map f {x_2} } {x_3 - x_2}$

Definition 3

$f$ is concave on $I$ if and only if:

$\forall x_1, x_2, x_3 \in I: x_1 < x_2< x_3: \dfrac {\map f {x_2} - \map f {x_1} } {x_2 - x_1} \ge \dfrac {\map f {x_3} - \map f {x_1} } {x_3 - x_1}$

Geometric Interpretation

Let $f$ be a concave real function.

Then:

for every pair of points $A$ and $B$ on the graph of $f$, the line segment $AB$ lies entirely below the graph.

Also known as

A concave function can also be referred to as:

a concave down function

a convex up function.

Examples

Cube Function on $\R_{\le 0}$

The real function defined as:

$\forall x \in \R: \map f x = x^3$

is concave where $\R \le 0$.

Also see

• Equivalence of Definitions of Concave Real Function

• Definition:Strictly Concave Real Function

• Definition:Convex Real Function
• Definition:Strictly Convex Real Function

• Real Function is Concave iff its Negative is Convex

• Results about concave real functions can be found here.

Sources

• 2008: David Nelson: The Penguin Dictionary of Mathematics (4th ed.) ... (previous) ... (next): concave function
• 2008: David Nelson: The Penguin Dictionary of Mathematics (4th ed.) ... (previous) ... (next): convex function