Alternating Sign Pentagons and Magog Pentagons

Abstract: Alternating sign triangles have been introduced by Ayyer, Behrend and Fischer in 2016 and it was proven that there is the same number of alternating sign triangles with $n$ rows as there is of $n\times n$ alternating sign matrices. Later on Fischer gave a refined enumeration of alternating sign triangles with respect to a statistic $\rho$, having the same distribution as the unique 1 in the top row of an alternating sign matrix, by connecting alternating sign triangles to $(0,n,n)$- Magog trapezoids. We introduce two more statistics counting the all $0$-columns on the left and right in an alternating sign triangle yielding objects we call alternating sign pentagons. We then show the equinumeracy of these alternating sign pentagons with Magog pentagons of a certain shape taking into account the statistic $\rho$. Furthermore we deduce a generating function of these alternating sign pentagons with respect to the statistic $\rho$ in terms of a Pfaffian and consider the implications of our new results on some open conjectures.