Comparing Left and Right Quotient Sets in Groups

Abstract

For a finite subset A of a group G, we define the right quotient set and the left quotient set of A, respectively, as AA-1 := \a1a2-1:a1,a2∈ A\, A-1A := \a1-1a2:a1,a2∈ A\. While the right and left quotient sets are equal if G is abelian, subtleties arise when G is a nonabelian group, where the cardinality difference |AA-1| - |A-1A| may be take on arbitrarily large values. Using the results of Martin and O'Bryant on the cardinality differences of sum sets and difference sets in Z, we prove in the infinite dihedral group, D∞ Z Z/2Z, every integer difference is achievable. Further, we prove that in F2, the free group on 2 generators, an integer difference is achievable if and only if that integer is even, and we explicitly construct subsets of F2 that achieve every even integer. We further determine the minimum cardinality of A ⊂ G so that the difference between the cardinalities of the left and right quotient sets is nonzero, depending on the existence of order 2 elements in G. To prove these results, we construct difference graphs DA and DA-1 which encode equality, respectively, in the right and left quotient sets. We observe a bijection from edges in DA to edges in DA-1 and count connected components in order to obtain our results on cardinality differences |AA-1| - |A-1A|.