convex set

Let $S$ a subset of ${ℝ}^n$. We say that $S$ is convex when, for any pair of points $A,B$ in $S$, the segment $\overline{AB}$ lies entirely inside $S$.

The former statement is equivalent to saying that for any pair of vectors $u,v$ in $S$, the vector $(1-t)u+tv$ is in $S$ for all $t\in [0,1]$.

If $S$ is a convex set, for any $u_1,u_2,\mathrm{\dots },u_r$ in $S$, and any positive numbers ${\lambda }_1,{\lambda }_2,\mathrm{\dots },{\lambda }_r$ such that ${\lambda }_1+{\lambda }_2+\mathrm{\cdots }+{\lambda }_r=1$ the vector

is in $S$.

Examples of convex sets in the plane are circles, triangles, and ellipses.The definition given above can be generalized to any real vector space:

Let $V$ be a vector space (over $ℝ$ or $ℂ$). A subset $S$ of $V$is convex if for all points $x,y$ in $S$, the line segment$\{\alpha x+(1-\alpha )y\mid \alpha \in (0,1)\}$ is also in $S$.

More generally, the same definition works for any vector space over anordered field.

A polyconvex set is a finite union of compact, convex sets.

Remark. The notion of convexity can be generalized to an arbitrary partially ordered set: given a poset $P$ (with partial ordering $\le$), a subset $C$ of $P$ is said to be convex if for any $a,b\in C$, if $c\in P$ is between $a$ and $b$, that is, $a\le c\le b$, then $c\in C$.