PolyaZähltheorie

PolyaZähltheorie, also known as Polya Enumeration Theorem, is a mathematical tool used to count distinct arrangements of objects under certain symmetry operations. It was developed by George Polya and is a generalization of Burnside's Lemma. The theorem is particularly useful in combinatorics and chemistry for solving problems where rotational or other symmetries are present.

The core idea behind PolyaZähltheorie is to associate a polynomial, called a figure polynomial, with each symmetry

For instance, when coloring the vertices of a square with two colors, symmetries like rotations and reflections

The theorem's applications extend beyond simple coloring problems to areas like molecular isomerism in chemistry, where