Partial Group Symmetry in Figures I: Semidirect Products and the Six Coins

Abstract

In this paper, we construct a partial group \(P(F)\) that represents the "partial symmetry" inherent in a subset \(F\) of \(d\)-dimensional Euclidean space. In cases where \(F\) is not connected, \(P(F)\) captures more detailed information than the conventional symmetry group \(G(F)\). To establish a stronger connection between \(P(F)\) and \(F\), we introduce a novel definition of partial group action. Furthermore, to characterize \(P(F)\) in specific cases, we define partial group actions on other partial groups and present a construction of the corresponding semidirect product.