Path counting and rank gaps in differential posets

Christian Gaetz, Praveen Venkataramana

Published 2018-06-09Version 1

We study the gaps $\Delta p_n$ between consecutive rank sizes in $r$-differential posets by introducing a projection operator whose matrix entries can be expressed in terms of the number of certain paths in the Hasse diagram. We strengthen Miller's result that $\Delta p_n \geq 1$, which resolved a longstanding conjecture of Stanley, by showing that $\Delta p_n \geq 2r$. We also obtain stronger bounds in the case that the poset has many substructures called threads.