中文

Generic initial ideals and squeezed spheres

交换代数 2007-06-26 v3 组合数学

摘要

In 1988 Kalai construct a large class of simplicial spheres, called squeezed spheres, and in 1991 presented a conjectured about generic initial ideals of Stanley--Reisner ideals of squeezed spheres. In the present paper this conjecture will be proved. In order to prove Kalai's conjecture, based on the fact that every squeezed (d1)(d-1)-sphere is the boundary of a certain dd-ball, called a squeezed dd-ball, generic initial ideals of Stanley--Reisner ideals of squeezed balls will be determined. In addition, generic initial ideals of exterior face ideals of squeezed balls are determined. On the other hand, we study the squeezing operation, which assigns to each Gorenstein* complex Γ\Gamma having the weak Lefschetz property a squeezed sphere Sq(Γ)\mathrm{Sq}(\Gamma), and show that this operation increases graded Betti numbers.

引用

@article{arxiv.math/0601442,
  title  = {Generic initial ideals and squeezed spheres},
  author = {Satoshi Murai},
  journal= {arXiv preprint arXiv:math/0601442},
  year   = {2007}
}

备注

28 pages, proofs in Section 5 and 6 are modified, an example of the squeezing operation is added, to appear in Adv. Math