We introduce and analyze a class of mathematical structures characterized bya finite group action on a state space that is deliberately non-transitive. This non-transitivity—which we term non-homogeneity in the sense of orbit non-uniformity—induces a natural stratification of the state space into orbits of varying cardinality.We define orbit weights via averaging over group orbits and derive an emergentpartial order based on stability indices (the relative size of stabilizer subgroups).The dynamics are required to be equivariant but not weight-preserving, allowingfor structural evolution. Special emphasis is placed on systems generated by in-volutions, which yield a natural center and complementary pairs. The resultingframework provides a rigorous mathematical foundation for studying systems withsymmetry breaking, hierarchical stratification, and dynamical integration withoutimposing external interpretive assumptions. Potential applications include symbolicdynamics and pattern formation.
Eduardo Gonzalez-Granda Fernandez (Thu,) studied this question.