Free regular set

In mathematics, a free regular set is a subset of a topological space that is acted upon disjointly under a given group action.^[1]

To be more precise, let X be a topological space. Let G be a group of homeomorphisms from X to X. Then we say that the action of the group G at a point $x\in X$ is freely discontinuous if there exists a neighborhood U of x such that $g(U)\cap U=\varnothing$ for all $g\in G$ , excluding the identity. Such a U is sometimes called a nice neighborhood of x.

The set of points at which G is freely discontinuous is called the free regular set and is sometimes denoted by $\Omega =\Omega (G)$ . Note that $\Omega$ is an open set.

If Y is a subset of X, then Y/G is the space of equivalence classes, and it inherits the canonical topology from Y; that is, the projection from Y to Y/G is continuous and open.

Note that $\Omega /G$ is a Hausdorff space.

Examples

The open set

\Omega (\Gamma )=\{\tau \in H:|\tau |>1,|\tau +\overline \tau |<1\}

is the free regular set of the modular group $\Gamma$ on the upper half-plane H. This set is called the fundamental domain on which modular forms are studied.

References

↑ Maskit, Bernard (1987). Discontinuous Groups in the Plane, Grundlehren der mathematischen Wissenschaften Volume 287. Springer Berlin Heidelberg. pp. 15–16. ISBN 978-3-642-64878-6.

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Free regular set

Examples

See also

References