konfigurationsinvariant

Konfigurationsinvariant is a term used to describe a quantity that is assigned to a configuration of objects and remains unchanged under a specified set of transformations. In practice, it is an invariant of a configuration with respect to a group action on its configuration space. The concept appears in mathematics, particularly in geometry, topology, combinatorics, and their applications in computer science and the sciences.

Formally, take a space X and consider configurations of n points in X, denoted Config_n(X). Let G

Common illustrative examples include:

- The pairwise distance multiset of a configuration in Euclidean space, which is invariant under isometries and

- The Euler characteristic or other topological invariants of the configuration space Conf_n(X), which remain constant under

- Polynomial or generating-function invariants derived from combinatorial encodings of configurations, such as orbit-counting polynomials under a

Applications of konfigurationsinvariants span geometry, robotics (analyzing feasible configurations of mechanisms), chemistry (conformational invariants of molecules),