Graph details

Graph # 34267

Adjacency matrix

[Too large to display]

Adjacency list

[Too large to display]

HoG graph id

34267

Graph name

Most Maximum Matchings Tree 32

Graph submitted by

Kevin Ryde

Invariant values

The definitions of the invariants can be found here.
Invariant Value Invariant Value
Acyclic Yes Index 2.451
Algebraic Connectivity 0.029 Laplacian Largest Eigenvalue 5.559
Average Degree 1.938 Longest Induced Cycle undefined
Bipartite Yes Longest Induced Path 12
Chromatic Index 4 Matching Number 9
Chromatic Number 2 Maximum Degree 4
Circumference undefined Minimum Degree 1
Claw-Free No Minimum Dominating Set 9
Clique Number 2 Number of Components 1
Connected Yes Number of Edges 31
Density 0.062 Number of Triangles 0
Diameter 12 Number of Vertices 32
Edge Connectivity 1 Planar Yes
Eulerian No Radius 6
Genus 0 Regular No
Girth undefined Second Largest Eigenvalue 2.289
Hamiltonian No Smallest Eigenvalue -2.451
Independence Number 23 Vertex Connectivity 1

A table row rendered like this indicates that the graph is marked as being interesting for that invariant.

Comments

Posted by Kevin Ryde at Feb 5, 2020 7:31 AM.
Heuberger and Wagner determine trees of n vertices with the most maximum matchings and show there is a unique such tree (except two each at n=6 and n=34). The present tree is n=32. It has 30966 maximum matchings (of size matchnum 9).

Clemens Heuberger and Stephan Wagner, "The Number of Maximum Matchings In a Tree", Discrete Mathematics, volume 311, issue 21, November 2011, pages 2512-2542. http://arxiv.org/abs/1011.6554

You need to be logged in to be able to add comments.