Matchings, Cycle Bases, and the Maximum Genus of a Graph

Michal Kotrbčík; Martin Škoviera

doi:10.37236/2479

Matchings, Cycle Bases, and the Maximum Genus of a Graph

The Electronic Journal of Combinatorics ◽

10.37236/2479 ◽

2012 ◽

Vol 19 (3) ◽

Cited By ~ 1

Author(s):

Michal Kotrbčík ◽

Martin Škoviera

Keyword(s):

Spanning Tree ◽

Spanning Trees ◽

Perfect Matching ◽

Intersection Graph ◽

Matching Number ◽

Maximum Genus ◽

Cycle Space ◽

Intersection Graphs ◽

Connected Graphs ◽

Cycle Bases

We study the interplay between the maximum genus of a graph and bases of its cycle space via the corresponding intersection graph. Our main results show that the matching number of the intersection graph is independent of the basis precisely when the graph is upper-embeddable, and completely describe the range of matching numbers when the graph is not upper-embeddable. Particular attention is paid to cycle bases consisting of fundamental cycles with respect to a given spanning tree. For $4$-edge-connected graphs, the intersection graph with respect to any spanning tree (and, in fact, with respect to any basis) has either a perfect matching or a matching missing exactly one vertex. We show that if a graph is not $4$-edge-connected, different spanning trees may lead to intersection graphs with different matching numbers. We also show that there exist $2$-edge connected graphs for which the set of values of matching numbers of their intersection graphs contains arbitrarily large gaps.

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Homeomorphically Irreducible Spanning Trees in Locally Connected Graphs

Combinatorics Probability Computing ◽

10.1017/s0963548311000526 ◽

2012 ◽

Vol 21 (1-2) ◽

pp. 107-111 ◽

Cited By ~ 9

Author(s):

GUANTAO CHEN ◽

HAN REN ◽

SONGLING SHAN

Keyword(s):

Connected Graph ◽

Spanning Tree ◽

Spanning Trees ◽

Connected Graphs

A spanning tree T of a graph G is called a homeomorphically irreducible spanning tree (HIST) if T does not contain vertices of degree 2. A graph G is called locally connected if, for every vertex v ∈ V(G), the subgraph induced by the neighbourhood of v is connected. In this paper, we prove that every connected and locally connected graph with more than 3 vertices contains a HIST. Consequently, we confirm the following conjecture due to Archdeacon: every graph that triangulates some surface has a HIST, which was proposed as a question by Albertson, Berman, Hutchinson and Thomassen.

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Turán-type results for intersection graphs of boxes

Combinatorics Probability Computing ◽

10.1017/s0963548321000171 ◽

2021 ◽

pp. 1-6

Author(s):

István Tomon ◽

Dmitriy Zakharov

Keyword(s):

Short Note ◽

Intersection Graph ◽

Intersection Graphs ◽

Poset Dimension ◽

Axis Parallel ◽

Turán Theorem ◽

Separation Dimension

Abstract In this short note, we prove the following analog of the Kővári–Sós–Turán theorem for intersection graphs of boxes. If G is the intersection graph of n axis-parallel boxes in $${{\mathbb{R}}^d}$$ such that G contains no copy of K t,t , then G has at most ctn( log n)2d+3 edges, where c = c(d)>0 only depends on d. Our proof is based on exploring connections between boxicity, separation dimension and poset dimension. Using this approach, we also show that a construction of Basit, Chernikov, Starchenko, Tao and Tran of K2,2-free incidence graphs of points and rectangles in the plane can be used to disprove a conjecture of Alon, Basavaraju, Chandran, Mathew and Rajendraprasad. We show that there exist graphs of separation dimension 4 having superlinear number of edges.

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EVOLUTION OF SHANGHAI STOCK MARKET BASED ON MAXIMAL SPANNING TREES

Modern Physics Letters B ◽

10.1142/s021798491350022x ◽

2012 ◽

Vol 27 (03) ◽

pp. 1350022 ◽

Cited By ~ 16

Author(s):

CHUNXIA YANG ◽

YING SHEN ◽

BINGYING XIA

Keyword(s):

Stock Market ◽

Stock Prices ◽

Spanning Tree ◽

Stock Price ◽

Spanning Trees ◽

Turning Points ◽

Single Step ◽

P Value ◽

Power Law Distribution ◽

Structure Variation

In this paper, using a moving window to scan through every stock price time series over a period from 2 January 2001 to 11 March 2011 and mutual information to measure the statistical interdependence between stock prices, we construct a corresponding weighted network for 501 Shanghai stocks in every given window. Next, we extract its maximal spanning tree and understand the structure variation of Shanghai stock market by analyzing the average path length, the influence of the center node and the p-value for every maximal spanning tree. A further analysis of the structure properties of maximal spanning trees over different periods of Shanghai stock market is carried out. All the obtained results indicate that the periods around 8 August 2005, 17 October 2007 and 25 December 2008 are turning points of Shanghai stock market, at turning points, the topology structure of the maximal spanning tree changes obviously: the degree of separation between nodes increases; the structure becomes looser; the influence of the center node gets smaller, and the degree distribution of the maximal spanning tree is no longer a power-law distribution. Lastly, we give an analysis of the variations of the single-step and multi-step survival ratios for all maximal spanning trees and find that two stocks are closely bonded and hard to be broken in a short term, on the contrary, no pair of stocks remains closely bonded for a long time.

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On the Isolated Vertices and Connectivity in Random Intersection Graphs

International Journal of Combinatorics ◽

10.1155/2011/872703 ◽

2011 ◽

Vol 2011 ◽

pp. 1-9 ◽

Cited By ~ 4

Author(s):

Yilun Shang

Keyword(s):

Random Graphs ◽

Intersection Graph ◽

Intersection Graphs ◽

Random Intersection Graph ◽

Probability Of Connectivity ◽

Asymptotic Probability

We study isolated vertices and connectivity in the random intersection graph . A Poisson convergence for the number of isolated vertices is determined at the threshold for absence of isolated vertices, which is equivalent to the threshold for connectivity. When and , we give the asymptotic probability of connectivity at the threshold for connectivity. Analogous results are well known in Erdős-Rényi random graphs.

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The Causal Tracing Method of Fast Moving Consumer Goods Logistics Quality Based on Extended Spanning Tree

Advanced Materials Research ◽

10.4028/www.scientific.net/amr.694-697.3480 ◽

2013 ◽

Vol 694-697 ◽

pp. 3480-3483

Author(s):

Shou Wen Ji ◽

Zeng Rong Su ◽

Zhi Hua Zhang

Keyword(s):

Consumer Goods ◽

Fast Moving ◽

Spanning Tree ◽

Spanning Trees ◽

Logic Model ◽

Fast Moving Consumer Goods ◽

Tracing Algorithm ◽

Tracing Method ◽

Logistics Quality

The paper analyzes the extended spanning trees elements corresponding to fast-moving consumer goods (FMCG) logistics quality. According to extended spanning tree, we establish a logic model of FMCGs logistics quality causal tracing. At last, the paper gives out tracing algorithm and specific tracing process of FMCG logistics quality based on extended spanning tree.

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On the number of leaves of a euclidean minimal spanning tree

Journal of Applied Probability ◽

10.2307/3214207 ◽

1987 ◽

Vol 24 (4) ◽

pp. 809-826 ◽

Cited By ~ 18

Author(s):

J. Michael Steele ◽

Lawrence A. Shepp ◽

William F. Eddy

Keyword(s):

Spanning Tree ◽

Spanning Trees ◽

Random Variables ◽

Minimal Spanning Tree ◽

Absolutely Continuous ◽

Mean And Variance ◽

Number Of Leaves ◽

The Mean ◽

Vertex Degrees ◽

Minimal Spanning Trees

Let Vk,n be the number of vertices of degree k in the Euclidean minimal spanning tree of Xi, , where the Xi are independent, absolutely continuous random variables with values in Rd. It is proved that n–1Vk,n converges with probability 1 to a constant α k,d. Intermediate results provide information about how the vertex degrees of a minimal spanning tree change as points are added or deleted, about the decomposition of minimal spanning trees into probabilistically similar trees, and about the mean and variance of Vk,n.

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FUZZY INTERSECTION GRAPHS OF FUZZY SEMIGROUPS

New Mathematics and Natural Computation ◽

10.1142/s179300570600035x ◽

2006 ◽

Vol 02 (01) ◽

pp. 1-10

Author(s):

M. K. SEN ◽

G. CHOWDHURY ◽

D. S. MALIK

Keyword(s):

Intersection Graph ◽

Common Multiple ◽

Intersection Graphs

Let S be a semigroup. This paper studies the intersection graphs of fuzzy semigroups. It is shown that the fuzzy intersection graph Int(G(S)), of S, is complete if and only if S is power joined. If Γ(S) denotes the set of all fuzzy right ideals of S, then the fuzzy intersection graph Int(Γ(S)) is complete if and only if S is fuzzy right uniform. Moreover, it is shown that Int(Γ(S)) is chordal if and only if for a,b,c,d ∈ S, some pair from {a,b,c,d} has a right common multiple property. It is also shown that if Int(G(S)) is complete and S has the acc on subsemigroups, then S is cyclic.

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A Minimum-Spanning-Tree-Inspired Algorithm for Channel Assignment in 802.11 Networks

International Journal of Electronics and Telecommunications ◽

10.1515/eletel-2016-0052 ◽

2016 ◽

Vol 62 (4) ◽

pp. 379-388 ◽

Cited By ~ 2

Author(s):

Iwona Dolińska ◽

Mariusz Jakubowski ◽

Antoni Masiukiewicz ◽

Grzegorz Rządkowski ◽

Kamil Piórczyński

Keyword(s):

Greedy Algorithm ◽

Channel Assignment ◽

Spanning Tree ◽

Spanning Trees ◽

Minimum Spanning Tree ◽

Minimum Spanning Trees ◽

Undirected Graphs ◽

Interference Level ◽

802.11 Networks ◽

Crowded Environment

Abstract Channel assignment in 2.4 GHz band of 802.11 standard is still important issue as a lot of 2.4 GHz devices are in use. This band offers only three non-overlapping channels, so in crowded environment users can suffer from high interference level. In this paper, a greedy algorithm inspired by the Prim’s algorithm for finding minimum spanning trees (MSTs) in undirected graphs is considered for channel assignment in this type of networks. The proposed solution tested for example network distributions achieves results close to the exhaustive approach and is, in many cases, several orders of magnitude faster.

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Component Evolution in Random Intersection Graphs

The Electronic Journal of Combinatorics ◽

10.37236/935 ◽

2007 ◽

Vol 14 (1) ◽

Cited By ~ 9

Author(s):

Michael Behrisch

Keyword(s):

Real World ◽

Linear Order ◽

Graph Model ◽

Vertex Degree ◽

Intersection Graph ◽

Giant Component ◽

Logarithmic Order ◽

Intersection Graphs ◽

Similarity Network ◽

Random Intersection Graph

We study the evolution of the order of the largest component in the random intersection graph model which reflects some clustering properties of real–world networks. We show that for appropriate choice of the parameters random intersection graphs differ from $G_{n,p}$ in that neither the so-called giant component, appearing when the expected vertex degree gets larger than one, has linear order nor is the second largest of logarithmic order. We also describe a test of our result on a protein similarity network.

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On the Chromatic Number of Intersection Graphs of Convex Sets in the Plane

The Electronic Journal of Combinatorics ◽

10.37236/1805 ◽

2004 ◽

Vol 11 (1) ◽

Cited By ~ 10

Author(s):

Seog-Jin Kim ◽

Alexandr Kostochka ◽

Kittikorn Nakprasit

Keyword(s):

Chromatic Number ◽

Convex Sets ◽

Convex Set ◽

Clique Number ◽

Finite Family ◽

Intersection Graph ◽

Intersection Graphs ◽

Homothetic Copies

Let $G$ be the intersection graph of a finite family of convex sets obtained by translations of a fixed convex set in the plane. We show that every such graph with clique number $k$ is $(3k-3)$-degenerate. This bound is sharp. As a consequence, we derive that $G$ is $(3k-2)$-colorable. We show also that the chromatic number of every intersection graph $H$ of a family of homothetic copies of a fixed convex set in the plane with clique number $k$ is at most $6k-6$.

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