A characterization of the symmetric groups on 4 and 5 letters

Hanlon, P., A Markov chain on the symmetric group and Jack symmetric functions, Discrete Mathematics 99 (1992) 123-140. Diaconis and Shahshahani studied a Markov chain Wf(l) whose states are the elements of the symmetric group S,. In W,(l), you move from a permutation n to any permutation of the for

Proton n.m.r. signals for two types of olefinic end groups, -CH,C(CH3)=CH2 (84.68 and 84.87) and -CH=C(CH,), (85.21), have been observed in high molecular weight polyisobutylenes. Comparable amounts of both these end groups exist in commercial and laboratory prepared samples of polyisobutylenes cont

We introduce a special harmoniousness called symmetric harmoniousness of groups and extend the R\*-sequenceability of abelian groups to nonabelian groups. We prove that the direct product of an R\*-sequenceable group of even order with a symmetric harmonious group of odd order is R\*-sequenceable. E

In this paper we investigate symmetric harmoniousness of groups and connections of this concept to the R\*-sequenceability of groups. We prove that, under suitable assumptions, the direct product of a symmetric harmonious group with a group that is R\*-sequenceable is R\*-sequenceable; we discuss th