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The algebraic composition of an element Formula: see text of a commutative binary structure Formula: see text is modeled by its divisor (pseudo)graph Formula: see text (which can be regarded as a simple graph if Formula: see text is an abelian group), whose vertices are the elements of Formula: see text such that two vertices Formula: see text and Formula: see text are adjacent if and only if Formula: see text. With respect to the action of a group of symmetries on the set of divisor pseudographs of Formula: see text, the numbers of orbits are considered, and these numbers are shown to yield groupoid-isotopy invariants when Formula: see text is a finite abelian group. The minimum number of orbits is computed for every abelian group of order at most 11, and it is also determined for all finite cyclic groups. Moreover, systems of pseudographs that can be realized as those of finite abelian groups are completely characterized. In fact, recurrence relations are given for constructing systems of divisor pseudographs of finite cyclic groups, and all commutative binary structures that are isotopic to a finite abelian group are established.
John D. LaGrange (Thu,) studied this question.