AI Chat AI Image Generator AI Video Text to Speech

Minimum status, matching and domination of graphs

09/08/2019

∙

by Caixia Liang, et al.

∙

∙

The minimum status of a graph is the minimum of statuses of all vertices of this graph. We give a sharp upper bound for the minimum status of a connected graph with fixed order and matching number (domination number, respectively), and characterize the unique trees achieving the bound. We also determine the unique tree such that its minimum status is as small as possible when order and matching number (domination number, respectively) are fixed.

Caixia Liang
1 publication
Bo Zhou
79 publications
Haiyan Guo
7 publications

page 1

page 2

page 3

page 4

research

∙ 08/02/2020

On extremal leaf status and internal status of trees

For a vertex u of a tree T, the leaf (internal, respectively) status of ...

0 Haiyan Guo, et al. ∙

research

∙ 08/31/2021

Graphs with minimum degree-based entropy

The degree-based entropy of a graph is defined as the Shannon entropy ba...

0 Yanni Dong, et al. ∙

research

∙ 11/30/2022

Approximate minimum cuts and their enumeration

We show that every α-approximate minimum cut in a connected graph is the...

0 Calvin Beideman, et al. ∙

research

∙ 08/21/2017

On Minimum Bisection and Related Cut Problems in Trees and Tree-Like Graphs

Minimum Bisection denotes the NP-hard problem to partition the vertex se...

0 Cristina G. Fernandes, et al. ∙

research

∙ 06/12/2018

On the minimum leaf number of cubic graphs

The minimum leaf number ml (G) of a connected graph G is defined as the ...

0 Jan Goedgebeur, et al. ∙

research

∙ 09/06/2021

Minimum Number of Bends of Paths of Trees in a Grid Embedding

We are interested in embedding trees T with maximum degree at most four ...

0 V. T. F. Luca, et al. ∙

research

∙ 07/08/2022

An optimal MOO strategy

We calculated a fixed strategy that minimizes the average number of gues...

0 Tetsuro Tanaka, et al. ∙