Abstract
In this article, we prove that if H is a non-normal subgroup of a finite nilpotent group G non-isomorphic to the dihedral group D 8 of order 8, then the number of isomorphism classes of normalized right transversals (NRTs) of H in G is greater than 16, where the isomorphism classes are formed with respect to the induced right-quasigroup structure (induced by the binary operation of G) on each NRT of H in G.
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