From $q$-Stirling numbers to the Delta Conjecture: a viewpoint from vincular patterns
arXiv:1810.06052
Abstract
The distribution of certain Mahonian statistic (called $\mathrm{BAST}$) introduced by Babson and SteingrÃmsson over the set of permutations that avoid vincular pattern $1\underline{32}$, is shown bijectively to match the distribution of major index over the same set. This new layer of equidistribution is then applied to give alternative interpretations of two related $q$-Stirling numbers of the second kind, studied by Carlitz and Gould. Moreover, extensions to an Euler-Mahonian statistic over ordered set partitions, and to statistics over ordered multiset partitions present themselves naturally. The latter of which is shown to be related to the recently proven Delta Conjecture. During the course, a refined relation between $\mathrm{BAST}$ and its reverse complement $\mathrm{STAT}$ is derived as well.
29 pages, a new extension to ordered multiset partitions added