Counting point configurations in projective space

We investigate the enumerative geometry of point configurations in projective space. We define “projective configuration counts”: these enumerate configurations of points in projective space such that certain specified subsets are in fixed relative positions. The $\mathbb{P}^1$ case recovers cross-ratio degrees, which arise naturally in numerous contexts. We establish two main results. The first is a combinatorial upper bound given by the number of weighted transversals of a bipartite graph. The second is a recursion that relates counts associated to projective spaces of different dimensions, by projecting away from a given point. Key inputs include the Gelfand-MacPherson correspondence, the Jacobi-Trudi and Thom-Porteous formulae, and the notion of surplus from matching theory of bipartite graphs.

💡 Research Summary

The paper introduces “projective configuration counts” as a higher‑dimensional analogue of cross‑ratio degrees. For fixed integers (r\ge2) and (n\ge r+1), let (X(r,