PlanetMath: triangle inequality

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triangle inequality

(Definition)

Let be a metric space. The triangle inequality states that for any three points $x,y,z\in X$ we have

$\begin{displaymath} d(x,y) \le d(x,z) + d(z,y). \end{displaymath}$

The name comes from the special case of $\mathbbmss{R}^n$ with the standard topology, and geometrically meaning that in any triangle, the sum of the lengths of two sides is greater (or equal) than the third.

Actually, the triangle inequality is one of the properties that define a metric, so it holds in any metric space. Two important cases are $\mathbbmss{R}$ with $d(x,y)=\vert x-y\vert$ and $\mathbbmss{C}$ with $d(x,y)=\Vert x-y\Vert$ (here we are using complex modulus, not absolute value).

There is a second triangle inequality, sometimes called the reverse triangle inequality, which also holds in any metric space and is derived from the definition of metric:

$\begin{displaymath} d(x,y) \ge \vert d(x,z) - d(z,y)\vert. \end{displaymath}$

In Euclidean geometry, this inequality is expressed by saying that each side of a triangle is greater than the difference of the other two.

The reverse triangle inequality can be proved from the first triangle inequality, as we now show.

Let $x, y, z \in X$ be given. For any $a,b,c \in X$ , from the first triangle inequality we have:

$\begin{displaymath} d(a,b) \le d(a,c) + d(c,b) \end{displaymath}$

and thus (using

for any $b, c \in X$ ):

$\begin{displaymath} d(a,c) \ge d(a,b) - d(b,c) \end{displaymath}$

(1)

and writing (1) with

$\begin{displaymath} d(x,y) \ge d(x,z) - d(z,y) \end{displaymath}$

(2)

while writing (1) with

we get:

$\begin{displaymath} d(y,x) \ge d(y,z) - d(z,x) \end{displaymath}$

$\begin{displaymath} d(x,y) \ge d(z,y) - d(x,z); \end{displaymath}$

(3)

from (2) and (3), using the properties of the absolute value, it follows finally:

$\begin{displaymath} d(x,y) \ge \left\vert d(x,z) - d(z,y)\right\vert \end{displaymath}$

which is the second triangle inequality.

"triangle inequality" is owned by drini. [ full author list (3) | owner history (1) ]

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See Also: proof of limit rule of product

Also defines:

reverse triangle inequality

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Cross-references: difference, inequality, Euclidean geometry, absolute value, complex modulus, metric, properties, sides, lengths, sum, triangle, standard topology, points, metric space
There are 48 references to this entry.

This is version 8 of triangle inequality, born on 2002-02-01, modified 2007-06-20.
Object id is 1629, canonical name is TriangleInequality.
Accessed 32248 times total.

Classification:

AMS MSC:	54-00 (General topology :: General reference works )
	54E35 (General topology :: Spaces with richer structures :: Metric spaces, metrizability)

Pending Errata and Addenda

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