English

Triangle singularities, ADE-chains, and weighted projective lines

Representation Theory 2012-03-27 v1 Algebraic Geometry

Abstract

We investigate the triangle singularity f=xa+yb+zcf=x^a+y^b+z^c, or S=k[x,y,z]/(f)S=k[x,y,z]/(f), attached to a weighted projective line XX given by the weight triple (a,b,c)(a,b,c). We investigate the stable category of vector bundles on XX obtained from the vector bundles by factoring out all line bundles. This category is triangulated and has Serre duality. It is, moreover, naturally equivalent to the stable category of graded maximal Cohen-Macaulay modules over SS (or matrix factorizations of ff), and then by results of Buchweitz and Orlov to the graded singularity category of ff. We show that this category is fractional Calabi-Yau with a CY-dimension that is a function of the Euler characteristic of XX. We show the existence of a tilting object which has the shape of an (a1)(b1)(c1)(a-1)(b-1)(c-1)-cuboid. Particular attention is given to the weight types (2,a,b)(2,a,b), yielding an explanation of Happel-Seidel symmetry for a class of important Nakayama algebras. In particular, the weight sequence (2,3,p)(2,3,p) corresponds to an ADE-chain, the EnE_n-chain, extrapolating the exceptional Dynkin cases E6E_6, E7E_7 and E8E_8 to a whole sequence of triangulated categories.

Keywords

Cite

@article{arxiv.1203.5505,
  title  = {Triangle singularities, ADE-chains, and weighted projective lines},
  author = {Dirk Kussin and Helmut Lenzing and Hagen Meltzer},
  journal= {arXiv preprint arXiv:1203.5505},
  year   = {2012}
}

Comments

54 pages, 5 tables, 5 figures

R2 v1 2026-06-21T20:39:31.869Z