Enriched toric [D]-partitions

Abstract

This paper develops the theory of enriched toric [D]-partitions. Whereas Stembridge's enriched P-partitions give rises to the peak algebra which is a subring of the ring of quasi-symmetric functions QSym, our enriched toric [D]-partitions will generate the cyclic peak algebra which is a subring of cyclic quasi-symmetric functions cQSym. In the same manner as the peak set of linear permutations appears when considering enriched P-partitions, the cyclic peak set of cyclic permutations plays an important role in our theory. The associated order polynomial is discussed based on this framework.