Homothety.html

In mathematics, a homothety (or homothecy or dilation) is a transformation of space which takes each line into a parallel line (in essence, a similarity that is similarly arranged). All dilatations form a group in either affine or Euclidean geometry. Typical examples of dilatations are translations, half-turns, and the identity transformation.

In Euclidean geometry, when not a translation, there is a unique number c by which distances in the dilatation are multiplied. It is called the ratio of magnification or dilation factor or similitude ratio. Such a transformation can be called an enlargement. More generally c can be negative; in that case it not only multiplies all distances by $| c |$ , but also inverts all points with respect to the fixed point.

Choose an origin or center A and a real number $c$ (possibly negative). The homothety $h A, c$ maps any point M to a point $M'$ such that

$A-M'=c(A-M)\!$

(as vectors).

A homothety is an affine transformation (if the fixed point is the origin: a linear transformation) and also a similarity transformation. It multiplies all distances by $| c |$ , all surface areas by $c 2$ , etc.

1 Homothetic relation
2 In economics
3 See also
4 External links

Homothetic relation

One application is a homothetic relation R. R, then, is homothetic if

$\text{for }a \in \mathbb{R}, a > 0, x R y \Rightarrow ax R ay.$

An economic application of this is that a utility function which is homogeneous of degree one corresponds to a homothetic preference relation.

In economics

In economics a homothetic function that can be decomposed into two functions, the outer being a function U(x) which is a homogeneous function of degree one in x, and an inner, f(y), which is a monotonically increasing function. U(f(y)) is a homothetic function.

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Homothety.html

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Homothetic relation

In economics

See also

External links