TY - JOUR
T1 - Reconstruction of singularities on orbifold del Pezzo surfaces from their Hilbert series
AU - Wormleighton, Ben
N1 - Publisher Copyright:
© 2019, © 2019 Taylor & Francis Group, LLC.
PY - 2020/1/2
Y1 - 2020/1/2
N2 - The Hilbert series of a polarized algebraic variety (X, D) is a powerful invariant that, while it captures some features of the geometry of (X, D) precisely, often cannot recover much information about its singular locus. This work explores the extent to which the Hilbert series of an orbifold del Pezzo surface fails to pin down its singular locus, which provides nonexistence results describing when there are no orbifold del Pezzo surfaces with a given Hilbert series, supplies bounds on the number of singularities on such surfaces, and has applications to the combinatorics of lattice polytopes in the toric case.
AB - The Hilbert series of a polarized algebraic variety (X, D) is a powerful invariant that, while it captures some features of the geometry of (X, D) precisely, often cannot recover much information about its singular locus. This work explores the extent to which the Hilbert series of an orbifold del Pezzo surface fails to pin down its singular locus, which provides nonexistence results describing when there are no orbifold del Pezzo surfaces with a given Hilbert series, supplies bounds on the number of singularities on such surfaces, and has applications to the combinatorics of lattice polytopes in the toric case.
KW - Hilbert series
KW - del Pezzo surface
KW - mirror symmetry
KW - orbifold singularity
UR - https://www.scopus.com/pages/publications/85068660119
U2 - 10.1080/00927872.2019.1632335
DO - 10.1080/00927872.2019.1632335
M3 - Article
AN - SCOPUS:85068660119
SN - 0092-7872
VL - 48
SP - 119
EP - 140
JO - Communications in Algebra
JF - Communications in Algebra
IS - 1
ER -