| Popis: |
We prove that Dyck's Surface, which is the connected sum of three projective planes, is a fine moduli stack of possibly-degenerate similarity classes of triangles, where degeneracy is defined broadly to be compatible with the metric closures of known constructions of nondegenerate spaces, which are based on either side-side-side or angle-angle-angle criteria. We also prove the blowup of $\mathbb C^3-\{0\}$ at three hyperplanes is a fine moduli stack of possibly-degenerate triangles, also using the broadest reasonable definition of degeneracy. |
