Vertex Decomposable Simplicial Complexes Associated to Path Graphs
author
Abstract:
Introduction Vertex decomposability of a simplicial complex is a combinatorial topological concept which is related to the algebraic properties of the Stanley-Reisner ring of the simplicial complex. This notion was first defined by Provan and Billera in 1980 for k-decomposable pure complexes which is known as vertex decomposable when . Later Bjorner and Wachs extended this concept to non-pure complexes. Being defined in an inductive way, vertex decomposable simplicial complexes are considered as a well behaved class of complexes and has been studied in many research papers. Because of their interesting algebraic and topological properties, giving a characterization for this class of complexes is of great importance and is one of the main problems in combinatorial commutative algebra. In this regard obtaining families of simplicial complexes with this property is of great interest. In this paper we present a new family of vertex decomposable simplicial complexes, which is associated to the t-clique ideal of the complement of path graphs. The t-clique ideal is a natural generalization of the concept of the edge ideal of a graph. For a graph G, a complete subgraph of G with t vertices is called a t-clique of G. The ideal generated by the monomials of degree t such that the induced subgraph of G on the set is a complete graph, is called the t-clique ideal of G. We consider the Stanley- Reisner simplicial complex of the ideal , where is a path graph of order n. For such a simplicial complex , we obtain the set of facets of and using this characterization we show that every such simplicial complex is vertex decomposable, whose shedding vertex is an endpoint of the path graph. Indeed, any simplicial complex in this family is Cohen-Macaulay, since it is pure. Since edge ideals of graphs are in fact 2-clique ideals, this family of simplicial complexes contains the independence complexes of complement of path graphs. Finally, as a consequence it is shown that the t-independence ideal of the complement of a path graph is vertex splittable and its Betti splitting is presented Material and methods To prove the vertex decomposability of , first we characterize the set of facets of . This helps us to find a shedding vertex for this simplicial complex and then by an inductive approach the vertex decomposability has been proved. Results and discussion For positive integers and , we show that a subset F of the vertex set of is a facet of if and only if and every component of the induced subgraph is a path graph of even order. Using this characterization, it is shown that any endpoint of the path graph is a shedding vertex of and is vertex decomposable. Moreover, it is proved that the ideal has a Betti splitting. Conclusion The following conclusions were drawn from this research. A characterization for the set of facets of the simplicial complex is presented. The simplicial complex is vertex decomposable for any positive integers and . The ideal has a Betti splitting for any any positive integers and ../files/site1/files/51/%D9%85%D8%B1%D8%A7%D8%AF%DB%8C.pdf
similar resources
Constructing vertex decomposable graphs
Recently, some techniques such as adding whiskers and attaching graphs to vertices of a given graph, have been proposed for constructing a new vertex decomposable graph. In this paper, we present a new method for constructing vertex decomposable graphs. Then we use this construction to generalize the result due to Cook and Nagel.
full textBalanced Vertex Decomposable Simplicial Complexes and their h-vectors
Given any finite simplicial complex ∆, we show how to construct from a colouring χ of ∆ a new simplicial complex ∆χ that is balanced and vertex decomposable. In addition, the h-vector of ∆χ is precisely the f -vector of ∆. Our construction generalizes the “whiskering” construction of Villarreal, and Cook and Nagel. We also reverse this construction to prove a special case of a conjecture of Coo...
full textconstructing vertex decomposable graphs
recently, some techniques such as adding whiskers and attaching graphs to vertices of a given graph, have been proposed for constructing a new vertex decomposable graph. in this paper, we present a new method for constructing vertex decomposable graphs. then we use this construction to generalize the result due to cook and nagel.
full textVertex Decomposable Graphs and Obstructions to Shellability
Inspired by several recent papers on the edge ideal of a graph G, we study the equivalent notion of the independence complex of G. Using the tool of vertex decomposability from geometric combinatorics, we show that 5-chordal graphs with no chordless 4-cycles are shellable and sequentially Cohen-Macaulay. We use this result to characterize the obstructions to shellability in flag complexes, exte...
full textDense Arbitrarily Vertex Decomposable Graphs
A graph G of order n is said to be arbitrarily vertex decomposable if for each sequence (n1, . . . , nk) of positive integers such that n1 + · · · + nk = n there exists a partition (V1, . . . , Vk) of the vertex set of G such that for each i ∈ {1, . . . , k}, Vi induces a connected subgraph of G on ni vertices. The main result of the paper reads as follows. Suppose that G is a connected graph o...
full textRecursively arbitrarily vertex-decomposable graphs
A graph G = (V,E) is arbitrarily vertex decomposable if for any sequence τ of positive integers adding up to |V |, there is a sequence of vertex-disjoint subsets of V whose orders are given by τ , and which induce connected graphs. The main aim of this paper is to study the recursive version of this problem. We present a solution for trees, suns, and partially for a class of 2-connected graphs ...
full textMy Resources
Journal title
volume 5 issue 1
pages 79- 84
publication date 2019-08
By following a journal you will be notified via email when a new issue of this journal is published.
No Keywords
Hosted on Doprax cloud platform doprax.com
copyright © 2015-2023