روش‌هایی نوین برای تولید مجتمع‌های سادکی پوسته‌پذیر

نویسندگان
دانشگاه تحصیلات تکمیلی علوم پایه زنجان
چکیده
یک کلاتر با مجموعه رئوس V یک پادزنجیر از زیرمجموعه‌های V است که همه راس‌ها را پوشش می‌دهد. ایدآل مداری I(C) وابسته به کلاتر C ایدآلی خالی از مربع است که توسط تک‌جمله‌ای‌های xi1 ... xik تولید می‌شود که در آن C∋{i1,...,ik} . همچنین مجتمع استقلال C مجتمع سادکی یکتای C است که I∆C=I(C) . در این مقاله نشان می‌دهیم هر کلاتر داده شده مانند C را می‌توان به شکل‌های متنوعی در یک کلاتر بزرگ‌تر مانند Cchr(chr(chr('39')39chr('39'))39chr(chr('39')39chr('39'))) نشاند به‌طوری که مجتمع استقلال Cchr(chr(chr('39')39chr('39'))39chr(chr('39')39chr('39'))) پوسته‌پذیر باشد. به‌ویژه کلاتر Cchr(chr(chr('39')39chr('39'))39chr(chr('39')39chr('39'))) می‌تواند طوری انتخاب شود که حلقه خارج‌قسمتی ایدآل مداری آن کوهن-مک‌اولی باشد.
کلیدواژه‌ها

عنوان مقاله English

New methods for constructing shellable simplicial complexes

نویسندگان English

Mohammad Farrokhi D. G.
Ali Akbar Yazdan Pour
Institute for Advanced Studies in Basic Sciences (IASBS)
چکیده English

A clutter $mathcal{C}$ with vertex set $[n]$ is an antichain of subsets of $[n]$, called circuits, covering all vertices. The clutter is $d$-uniform if all of its circuits have the same cardinality $d$. If $mathbb{K}$ is a field, then there is a one-to-one correspondence between clutters on $V$ and square-free monomial ideals in $mathbb{K}[x_1,ldots,x_n]$ as follows: To each clutter $mathcal{C}$ we correspond its circuit ideal $I(mathcal{C})$ generated by monomials $x_{i_1}cdots x_{i_k}$ with ${i_1,ldots,i_k}inmathcal{C}$. Conversely, to each square-free monomial ideal $I$ with minimal set of generators $mathcal{G}(I)$, we correspond a clutter with circuits ${i_1,ldots,i_k}$, where $x_{i_1}cdots x_{i_k}inmathcal{G}(I)$. The independence complex of a clutter $mathcal{C}$ on $[n]$ is the simplicial complex $Delta_{mathcal{C}}$ whose faces are independent sets in $mathcal{C}$ by which we mean sets $Fsubseteq [n]$ such that $ensubseteq F$ for all $einmathcal{C}$. It is easy to see that the Stanley-Reisner ideal of $Delta_{mathcal{C}}$ coincides with $I(mathcal{C})$. The above correspondence establishes a one-to-one correspondence between simplicial complexes and independence complex of clutters. A simplicial complex $Delta$ is shellable if there exists a total order on its facets, say $F_1

کلیدواژه‌ها English

Clutter
Hybrid clutter
Shellability
Cohen-Macaulay
Independence complex
1. J. Biermann, and A. Van Tuyl, “Balanced vertex decomposable simplicial complexes and their h-vectors”, Electron. J. Combin. 20(3) (2013), #R15.

2. A. Björner and M. Wachs, “Shellable nonpure complexes and posets. I”, Trans. Amer. Math. Soc. 348(4) (1996), 3945-3975.

3. W. Bruns and J. Herzog, “Cohen-Macaulay Rings”, Cambridge Studies in Advanced Mathematics, 39. Cambridge University Press, Cambridge, (1993).

4. D. Cook II and U. Nagel, “Cohen-Macaulay graphs and face vectors of flag complexes”, SIAM J. Discret. Math. 26(1) (2012), 89-101.

5. A. Dochtermann and A. Engström, “Algebraic properties of edge ideals via combinatorial topology”, Electron. J. Combin. 16(2) (2009), #R2.

6. S. Faridi, “Cohen-Macaulay properties of square-free monomial ideals”, J. Combin. Theory Ser. A 109(2) (2005), 299-329.

7. A. Francisco and A. Van Tuyl, “Sequentially Cohen-Macaulay edge ideals”, Proc. Amer. Math. Soc. 135(8) (2007), 2327-2337.

8. J. Gallier, “Notes on convex sets, polytopes, polyhedra, combinatorial topology, Voronoi diagrams and Delaunay triangulations”, arXiv: 0805.0292 (2008).

9. X. Goaoc, P. Paták, Z. Patáková, M. Tancer, and U. Wagner, “Shellability is NP-complete”, J. ACM 66(3) (2019), Art. 21, 18 pp.

10. T. Hibi, A. Higashitani, K. Kimura, and A. B. O'Keefe, “Algebraic study on Cameron-Walker graphs”, J. Algebra 422 (2015), 257-269.

11. A. Macchia, “The arithmetical rank of the edge ideals of graphs with whisker”, Beitr. Algebra Geom. 56 (2015), 147-158.

12. Mousivand, S. A. Seyed Fakhari, and S. Yassemi, “A new construction for Cohen-Macaulay graphs”, Comm. Algebra 43(2) (2015), 5104-5112.

13. M. R. Pournaki, S. A. Seyed Fakhari, and S. Yassemi, “New classes of set-theoretic complete intersection monomial ideals”, Comm. Algebra 43(9) (2015), 3920-3924.

14. R. P. Stanley, “Combinatorics and Commutative Algebra”, 2nd ed., Progr. Math. 41, Birkhäuser Boston, Boston, MA (1996).

15. R. H. Villarreal, “Cohen-Macaulay graphs”, Manus. Math. 66 (1990), 277-293.

16. R. H. Villarreal, “Monomial Algebras”, Monographs and Textbooks in Pure and Applied Mathematics, vol. 238, Marcel Dekker, Inc., New York, 2001.