On the Facet Ideal of an Expanded Simplicial Complex

We define the chordal simplicial complex by using the definition of chordal clutter introduced by Woodroofe. We show that the facet ideal of the chordal simplicial complex is Cohen–Macaulay if and only if it is unmixed. Moreover, we prove that the facet ideal of a chordal simplicial complex has infinitely many nontrivial Cohen–Macaulay modifications.

Download Full-text

A Construction of Sequentially Cohen–Macaulay Graphs

Algebra Colloquium ◽

10.1142/s1005386721000316 ◽

2021 ◽

Vol 28 (03) ◽

pp. 399-414

Author(s):

Aming Liu ◽

Tongsuo Wu

Keyword(s):

Simplicial Complex ◽

Betti Numbers ◽

Simple Graph ◽

Ideal Formula ◽

Vertex Decomposable ◽

Linear Quotients ◽

Facet Ideal

For every simple graph [Formula: see text], a class of multiple clique cluster-whiskered graphs [Formula: see text] is introduced, and it is shown that all such graphs are vertex decomposable; thus, the independence simplicial complex [Formula: see text] is sequentially Cohen–Macaulay. The properties of the graphs [Formula: see text] and [Formula: see text] constructed by Cook and Nagel are studied, including the enumeration of facets of the complex [Formula: see text] and the calculation of Betti numbers of the cover ideal [Formula: see text]. We also prove that the complex[Formula: see text] is strongly shellable and pure for either a Boolean graph [Formula: see text] or the full clique-whiskered graph [Formula: see text] of [Formula: see text], which is obtained by adding a whisker to each vertex of [Formula: see text]. This implies that both the facet ideal [Formula: see text] and the cover ideal [Formula: see text] have linear quotients.

Download Full-text

Spanning Simplicial Complex of Wheel Graph Wn

Algebra Colloquium ◽

10.1142/s1005386719000233 ◽

2019 ◽

Vol 26 (02) ◽

pp. 309-320 ◽

Cited By ~ 1

Author(s):

A. Zahid ◽

M.U. Saleem ◽

A. Kashif ◽

M. Khan ◽

M.A. Meraj ◽

...

Keyword(s):

Simplicial Complex ◽

Hilbert Series ◽

Associated Primes ◽

Face Ring ◽

Combinatorial Properties ◽

Ideal Formula ◽

Wheel Graph ◽

Vertex Set ◽

Facet Ideal

In this paper, we explore the spanning simplicial complex of wheel graph Wn on vertex set [n]. Combinatorial properties of the spanning simplicial complex of wheel graph are discussed, which are then used to compute the f-vector and Hilbert series of face ring k[Δs(Wn)] for the spanning simplicial complex Δs(Wn). Moreover, the associated primes of the facet ideal [Formula: see text] are also computed.

Download Full-text

Generating the Mapping Class Group

10.23943/princeton/9780691147949.003.0005 ◽

2017 ◽

Author(s):

Benson Farb ◽

Dan Margalit

Keyword(s):

Exact Sequence ◽

Simplicial Complex ◽

Mapping Class Group ◽

Class Group ◽

Mapping Class ◽

Detailed Structure ◽

Inductive Step ◽

Closed Curves ◽

Combinatorial Object ◽

Generating Sets

This chapter considers the Dehn–Lickorish theorem, which states that when g is greater than or equal to 0, the mapping class group Mod(Sɡ) is generated by finitely many Dehn twists about nonseparating simple closed curves. The theorem is proved by induction on genus, and the Birman exact sequence is introduced as the key step for the induction. The key to the inductive step is to prove that the complex of curves C(Sɡ) is connected when g is greater than or equal to 2. The simplicial complex C(Sɡ) is a useful combinatorial object that encodes intersection patterns of simple closed curves in Sɡ. More detailed structure of C(Sɡ) is then used to find various explicit generating sets for Mod(Sɡ), including those due to Lickorish and to Humphries.

Download Full-text

Algebraic Shifting and Sequentially Cohen-Macaulay Simplicial Complexes

The Electronic Journal of Combinatorics ◽

10.37236/1245 ◽

1996 ◽

Vol 3 (1) ◽

Cited By ~ 22

Author(s):

Art M. Duval

Keyword(s):

Simplicial Complex ◽

Simplicial Complexes ◽

Pure Case ◽

Definition Of ◽

Algebraic Shifting

Björner and Wachs generalized the definition of shellability by dropping the assumption of purity; they also introduced the $h$-triangle, a doubly-indexed generalization of the $h$-vector which is combinatorially significant for nonpure shellable complexes. Stanley subsequently defined a nonpure simplicial complex to be sequentially Cohen-Macaulay if it satisfies algebraic conditions that generalize the Cohen-Macaulay conditions for pure complexes, so that a nonpure shellable complex is sequentially Cohen-Macaulay. We show that algebraic shifting preserves the $h$-triangle of a simplicial complex $K$ if and only if $K$ is sequentially Cohen-Macaulay. This generalizes a result of Kalai's for the pure case. Immediate consequences include that nonpure shellable complexes and sequentially Cohen-Macaulay complexes have the same set of possible $h$-triangles.

Download Full-text

Finite Repetitive Generalized Cluster Complexes and d-Cluster Categories

Algebra Colloquium ◽

10.1142/s1005386713000114 ◽

2013 ◽

Vol 20 (01) ◽

pp. 123-140

Author(s):

Teng Zou ◽

Bin Zhu

Keyword(s):

Simplicial Complex ◽

Root System ◽

Cluster Complex ◽

Cluster Complexes ◽

Endomorphism Algebras ◽

Tilted Algebras ◽

Cluster Categories ◽

Hereditary Algebras ◽

Cluster Tilting ◽

Tilting Objects

For any positive integer n, we construct an n-repetitive generalized cluster complex (a simplicial complex) associated with a given finite root system by defining a compatibility degree on the n-repetitive set of the colored root system. This simplicial complex includes Fomin-Reading's generalized cluster complex as a special case when n=1. We also introduce the intermediate coverings (called generalized d-cluster categories) of d-cluster categories of hereditary algebras, and study the d-cluster tilting objects and their endomorphism algebras in those categories. In particular, we show that the endomorphism algebras of d-cluster tilting objects in the generalized d-cluster categories provide the (finite) coverings of the corresponding (usual) d-cluster tilted algebras. Moreover, we prove that the generalized d-cluster categories of hereditary algebras of finite representation type provide a category model for the n-repetitive generalized cluster complexes.

Download Full-text

A non-partitionable Cohen–Macaulay simplicial complex

Advances in Mathematics ◽

10.1016/j.aim.2016.05.011 ◽

2016 ◽

Vol 299 ◽

pp. 381-395 ◽

Cited By ~ 18

Author(s):

Art M. Duval ◽

Bennet Goeckner ◽

Caroline J. Klivans ◽

Jeremy L. Martin

Keyword(s):

Simplicial Complex

Download Full-text

Markovian approach to tackle competing pathogens in simplicial complex

Applied Mathematics and Computation ◽

10.1016/j.amc.2021.126773 ◽

2022 ◽

Vol 417 ◽

pp. 126773

Author(s):

Yanyi Nie ◽

Wenyao Li ◽

Liming Pan ◽

Tao Lin ◽

Wei Wang

Keyword(s):

Simplicial Complex ◽

Markovian Approach

Download Full-text

Simplicial Complexes of Whisker Type

The Electronic Journal of Combinatorics ◽

10.37236/4894 ◽

2015 ◽

Vol 22 (1) ◽

Author(s):

Mina Bigdeli ◽

Jürgen Herzog ◽

Takayuki Hibi ◽

Antonio Macchia

Keyword(s):

Simplicial Complex ◽

Short Proof ◽

Monomial Ideal ◽

Simplicial Complexes ◽

Linear Resolution ◽

Cw Complex ◽

Alexander Dual ◽

Vertex Decomposable ◽

The Ideal

Let $I\subset K[x_1,\ldots,x_n]$ be a zero-dimensional monomial ideal, and $\Delta(I)$ be the simplicial complex whose Stanley--Reisner ideal is the polarization of $I$. It follows from a result of Soleyman Jahan that $\Delta(I)$ is shellable. We give a new short proof of this fact by providing an explicit shelling. Moreover, we show that $\Delta(I)$ is even vertex decomposable. The ideal $L(I)$, which is defined to be the Stanley--Reisner ideal of the Alexander dual of $\Delta(I)$, has a linear resolution which is cellular and supported on a regular CW-complex. All powers of $L(I)$ have a linear resolution. We compute $\mathrm{depth}\ L(I)^k$ and show that $\mathrm{depth}\ L(I)^k=n$ for all $k\geq n$.

Download Full-text