Annulus (mathematics)

In mathematics, an annulus (the Latin word for "little ring", with plural annuli) is a ring-shaped object, especially a region bounded by two concentric circles. The adjectival form is annular (as in annular eclipse).

The open annulus is topologically equivalent to both the open cylinder $S 1 \times (0,1)$ and the punctured plane. Informally, it has the shape of a hardware washer.

The area of an annulus is the difference in the areas of the larger circle of radius $R$ and the smaller one of radius $r$ :

A = \pi R^2 - \pi r^2 = \pi(R^2 - r^2).

The area of an annulus can be obtained from the length of the longest interval that can lie completely inside the annulus, 2*d in the accompanying diagram. This can be proven by the Pythagorean theorem; the interval of greatest length that can lie completely inside the annulus will be tangent to the smaller circle and form a right angle with its radius at that point. Therefore, d and r are the sides of a right-angled triangle with hypotenuse R and the area is given by

A = \pi\left(R^2 - r^2\right) = \pi d^2.

The area can also be obtained via calculus by dividing the annulus up into an infinite number of annuli of infinitesimal width $d ρ$ and area $2 π ρ d ρ$ and then integrating from ρ = r to ρ = R:

A = \int_r^R 2\pi\rho\, d\rho = \pi\left(R^2 - r^2\right).

The area of an annulus sector of angle $θ$ , with $θ$ measured in radians, is given by

A = \frac{\theta}{2} \left(R^2 - r^2\right).

Complex structure

In complex analysis an annulus $ann(a; r, R)$ in the complex plane is an open region defined as

r < |z - a| < R.

If $r$ is $0$ , the region is known as the punctured disk of radius $R$ around the point $a$ .

As a subset of the complex plane, an annulus can be considered as a Riemann surface. The complex structure of an annulus depends only on the ratio $r / R$ . Each annulus $ann(a; r, R)$ can be holomorphically mapped to a standard one centered at the origin and with outer radius $1$ by the map

z \mapsto \frac{z - a}{R}.

The inner radius is then $r / R < 1$ .

The Hadamard three-circle theorem is a statement about the maximum value a holomorphic function may take inside an annulus.

External links

Annulus definition and properties With interactive animation
Area of an annulus, formula With interactive animation

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Annulus (mathematics)

Complex structure

See also

External links