Your search keyword '"Magnant Colton"' showing total 329 results

1. On Proper (Strong) Rainbow Connection of Graphs

Author

Jiang Hui, Li Wenjing, Li Xueliang, and Magnant Colton

Subjects

proper (strong) rainbow connection number, cartesian product, chromatic index, 05c15, 05c40, 05c75, Mathematics, QA1-939

Abstract

A path in an edge-colored graph G is called a rainbow path if no two edges on the path have the same color. The graph G is called rainbow connected if between every pair of distinct vertices of G, there is a rainbow path. Recently, Johnson et al. considered this concept with the additional requirement that the coloring of G is proper. The proper rainbow connection number of G, denoted by prc(G), is the minimum number of colors needed to properly color the edges of G so that G is rainbow connected. Similarly, the proper strong rainbow connection number of G, denoted by psrc(G), is the minimum number of colors needed to properly color the edges of G such that for any two distinct vertices of G, there is a rainbow geodesic (shortest path) connecting them. In this paper, we characterize those graphs with proper rainbow connection numbers equal to the size or within 1 of the size. Moreover, we completely solve a question proposed by Johnson et al. by proving that if G = Kp1Kpn, where n≥ 1, and p1, . . . , pn>1 are integers, then prc(G) = psrc(G) = χ′(G), where χ′(G) denotes the chromatic index of G. Finally, we investigate some su cient conditions for a graph G to satisfy prc(G) = rc(G), and make some slightly positive progress by using a relation between rc(G) and the girth of the graph.

Published

2021

2. The Proper Diameter of a Graph

Author

Coll Vincent, Hook Jonelle, Magnant Colton, McCready Karen, and Ryan Kathleen

Subjects

diameter, properly connected, proper diameter, 05c12, 05c15, Mathematics, QA1-939

Abstract

A proper edge-coloring of a graph is a coloring in which adjacent edges receive distinct colors. A path is properly colored if consecutive edges have distinct colors, and an edge-colored graph is properly connected if there exists a properly colored path between every pair of vertices. In such a graph, we introduce the notion of the graph’s proper diameter—which is a function of both the graph and the coloring—and define it to be the maximum length of a shortest properly colored path between any two vertices in the graph. We consider various families of graphs to find bounds on the gap between the diameter and possible proper diameters, paying singular attention to 2-colorings.

Published

2020

3. Generalized Rainbow Connection of Graphs and their Complements

Author

Li Xueliang, Magnant Colton, Wei Meiqin, and Zhu Xiaoyu

Subjects

ℓ-rainbow path, (k, ℓ)-rainbow connected, (k, ℓ)-rainbow connection number, 04c15, 05c40, Mathematics, QA1-939

Abstract

Let G be an edge-colored connected graph. A path P in G is called ℓ-rainbow if each subpath of length at most ℓ + 1 is rainbow. The graph G is called (k, ℓ)-rainbow connected if there is an edge-coloring such that every pair of distinct vertices of G is connected by k pairwise internally vertex-disjoint ℓ-rainbow paths in G. The minimum number of colors needed to make G (k, ℓ)-rainbow connected is called the (k, ℓ)-rainbow connection number of G and denoted by rck,ℓ(G). In this paper, we first focus on the (1, 2)-rainbow connection number of G depending on some constraints of Ḡ. Then, we characterize the graphs of order n with (1, 2)-rainbow connection number n − 1 or n − 2. Using this result, we investigate the Nordhaus-Gaddum-Type problem of (1, 2)-rainbow connection number and prove that rc1,2(G) + rc1,2(Ḡ) ≤ n + 2 for connected graphs G and Ḡ. The equality holds if and only if G or Ḡ is isomorphic to a double star.

Published

2018

4. A decomposition of gallai multigraphs

Author

Halperin Alexander, Magnant Colton, and Pula Kyle

Subjects

edge coloring, gallai multigraph, Mathematics, QA1-939

Abstract

An edge-colored cycle is rainbow if its edges are colored with distinct colors. A Gallai (multi)graph is a simple, complete, edge-colored (multi)graph lacking rainbow triangles. As has been previously shown for Gallai graphs, we show that Gallai multigraphs admit a simple iterative construction. We then use this structure to prove Ramsey-type results within Gallai colorings. Moreover, we show that Gallai multigraphs give rise to a surprising and highly structured decomposition into directed trees

Published

2014

5. Gallai-Ramsey number for the union of stars

Author

Mao, Yaping, Wang, Zhao, Magnant, Colton, and Sciermeyer, Ingo

Subjects

Mathematics - Combinatorics

Abstract

Given a graph $G$ and a positive integer $k$, define the \emph{Gallai-Ramsey number} to be the minimum number of vertices $n$ such that any $k$-edge coloring of the complete graph $K_n$ contains either a rainbow (all different colored) triangle or a monochromatic copy of $G$. In this paper, we obtain the exact value of the Gallai-Ramsey numbers for the union of two stars in many cases and bounds in other cases. This work represents the first class of disconnected graphs to be considered as the desired monochromatic subgraph., Comment: arXiv admin note: text overlap with arXiv:1809.10298

Published

2020

6. Gallai Ramsey number for double stars

Author

Katona, Gyula O. H., Magnant, Colton, Mao, Yaping, and Wang, Zhao

Subjects

Mathematics - Combinatorics

Abstract

Given a graph $G$ and a positive integer $k$, the \emph{Gallai-Ramsey number} is defined to be the minimum number of vertices $n$ such that any $k$-edge coloring of $K_n$ contains either a rainbow (all different colored) copy of $G$ or a monochromatic copy of $G$. In this paper, we obtain general upper and lower bounds on the Gallai-Ramsey numbers for double stars $S(n,m)$, where $S(n,m)$ is the graph obtained from the union of two stars $K_{1,n}$ and $K_{1,m}$ by adding an edge between their centers. We also provide the sharp result in some cases.

Published

2020

7. Ramsey and Gallai-Ramsey numbers for stars with extra independent edges

Author

Mao, Yaping, Wang, Zhao, Magnant, Colton, and Schiermeyer, Ingo

Subjects

Mathematics - Combinatorics

Abstract

Given a graph $G$ and a positive integer $k$, define the \emph{Gallai-Ramsey number} to be the minimum number of vertices $n$ such that any $k$-edge coloring of $K_n$ contains either a rainbow (all different colored) triangle or a monochromatic copy of $G$. In this paper, we obtain general upper and lower bounds on the Gallai-Ramsey numbers for the graph $G = S_t^{r}$ obtained from a star of order $t$ by adding $r$ extra independent edges between leaves of the star so there are $r$ triangles and $t - 2r - 1$ pendent edges in $S_t^{r}$. We also prove some sharp results when $t = 2$.

Published

2019

8. Ramsey and Gallai-Ramsey number for wheels

Author

Mao, Yaping, Wang, Zhao, Magnant, Colton, and Schiermeyer, Ingo

Subjects

Mathematics - Combinatorics, 05C55

Abstract

Given a graph $G$ and a positive integer $k$, define the \emph{Gallai-Ramsey number} to be the minimum number of vertices $n$ such that any $k$-edge coloring of $K_n$ contains either a rainbow (all different colored) triangle or a monochromatic copy of $G$. Much like graph Ramsey numbers, Gallai-Ramsey numbers have gained a reputation as being very difficult to compute in general. As yet, still only precious few sharp results are known. In this paper, we obtain bounds on the Gallai-Ramsey number for wheels and the exact value for the wheel on $5$ vertices., Comment: arXiv admin note: text overlap with arXiv:1809.10298, arXiv:1902.10706

Published

2019

9. Note on a generalization of Gallai-Ramsey numbers

Author

Magnant, Colton and Magnant, Zhuojun

Subjects

Mathematics - Combinatorics, 05C55

Abstract

A colored complete graph is said to be Gallai-colored if it contains no rainbow triangle. This property has been shown to be equivalent to the existence of a partition of the vertices (of every induced subgraph) in which at most two colors appear on edges between the parts and at most one color appears on edges in between each pair of parts. We extend this notion by defining a coloring of a complete graph to be $k$-Gallai if every induced subgraph has a nontrivial partition of the vertices such that there are at most $k$ colors present in between parts of the partition. The generalized $(k, \ell)$ Gallai-Ramsey number of a graph $H$ is then defined to be the minimum number of vertices $N$ such that every $k$-Gallai coloring of a complete graph $K_{n}$ with $n \geq N$ using at most $\ell$ colors contains a monochromatic copy of $H$. We prove bounds on these generalized $(k, \ell)$ Gallai-Ramsey numbers based on the structure of $H$, extending recent results for Gallai colorings.

Published

2019

10. Properly colored $C_{4}$'s in edge-colored graphs

Author

Xu, Chuandong, Magnant, Colton, and Zhang, Shenggui

Subjects

Mathematics - Combinatorics, Computer Science - Discrete Mathematics

Abstract

When many colors appear in edge-colored graphs, it is only natural to expect rainbow subgraphs to appear. This anti-Ramsey problem has been studied thoroughly and yet there remain many gaps in the literature. Expanding upon classical and recent results forcing rainbow triangles to appear, we consider similar conditions which force the existence of a properly colored copy of $C_{4}$., Comment: corrected a statement after Theorem 4

Published

2019

11. Beginning Mathematical Writing Assignments

Author

Halperin, Alexander, Magnant, Colton, and Magnant, Zhuojun

Subjects

Mathematics - History and Overview

Abstract

Writing assignments in any mathematics course always present several challenges, particularly in lower-level classes where the students are not expecting to write more than a few words at a time. Developed based on strategies from several sources, the two small writing assignments included in this paper represent a gentle introduction to the writing of mathematics and can be utilized in a variety of low-to-middle level courses in a mathematics major.

Published

2019

12. Gallai-Ramsey number of an 8-cycle

Author

Gregory, Jonathan, Magnant, Colton, and Magnant, Zhuojun

Subjects

Mathematics - Combinatorics

Abstract

Given graphs $G$ and $H$ and a positive integer $k$, the Gallai-Ramsey number $gr_{k}(G : H)$ is the minimum integer $N$ such that for any integer $n \geq N$, every $k$-edge-coloring of $K_{n}$ contains either a rainbow copy of $G$ or a monochromatic copy of $H$. These numbers have recently been studied for the case when $G = K_{3}$, where still only a few precise numbers are known for all $k$. In this paper, we extend the known precise Gallai-Ramsey numbers to include $H = C_{8}$ for all $k$.

Published

2019

13. Gallai-Ramsey numbers for fans

Author

Mao, Yaping, Wang, Zhao, Magnant, Colton, and Schiermeyer, Ingo

Subjects

Mathematics - Combinatorics, 05C55

Abstract

Given a graph $G$ and a positive integer $k$, define the \emph{Gallai-Ramsey number} to be the minimum number of vertices $n$ such that any $k$-edge coloring of $K_n$ contains either a rainbow (all different colored) triangle or a monochromatic copy of $G$. In this paper, we obtain general upper and lower bounds on the Gallai-Ramsey numbers for fans $F_{m} = K_{1} + mK_{2}$ and prove the sharp result for $m = 2$ and for $m = 3$ with $k$ even., Comment: arXiv admin note: text overlap with arXiv:1809.10298

Published

2019

14. Gallai-Ramsey numbers for rainbow paths

Author

Li, Xihe, Besse, Pierre, Magnant, Colton, Wang, Ligong, and Watts, Noah

Subjects

Mathematics - Combinatorics, 05C55

Abstract

Given graphs $G$ and $H$ and a positive integer $k$, the \emph{Gallai-Ramsey number}, denoted by $gr_{k}(G : H)$ is defined to be the minimum integer $n$ such that every coloring of $K_{n}$ using at most $k$ colors will contain either a rainbow copy of $G$ or a monochromatic copy of $H$. We consider this question in the cases where $G \in \{P_{4}, P_{5}\}$. In the case where $G = P_{4}$, we completely solve the Gallai-Ramsey question by reducing to the $2$-color Ramsey numbers. In the case where $G = P_{5}$, we conjecture that the problem reduces to the $3$-color Ramsey numbers and provide several results in support of this conjecture., Comment: 20 pages, 2 figures

Published

2019

15. Gallai-Ramsey number for $K_{5}$

Author

Magnant, Colton and Schiermeyer, Ingo

Subjects

Mathematics - Combinatorics, 05C55

Abstract

Given a graph $H$, the $k$-colored Gallai Ramsey number $gr_{k}(K_{3} : H)$ is defined to be the minimum integer $n$ such that every $k$-coloring of the edges of the complete graph on $n$ vertices contains either a rainbow triangle or a monochromatic copy of $H$. Fox et al. [J. Fox, A. Grinshpun, and J. Pach. The Erd{\H o}s-Hajnal conjecture for rainbow triangles. J. Combin. Theory Ser. B, 111:75-125, 2015.] conjectured the value of the Gallai Ramsey numbers for complete graphs. Recently, this conjecture has been verified for the first open case, when $H = K_{4}$. In this paper we attack the next case, when $H = K_5$. Surprisingly it turns out, that the validity of the conjecture depends upon the (yet unknown) value of the Ramsey number $R(5,5)$. It is known that $43 \leq R(5,5) \leq 48$ and conjectured that $R(5,5)=43$ [B.D. McKay and S.P. Radziszowski. Subgraph counting identities and Ramsey numbers. J. Combin. Theory Ser. B, 69:193-209, 1997]. If $44 \leq R(5,5) \leq 48$, then Fox et al.'s conjecture is true and we present a complete proof. If, however, $R(5,5)=43$, then Fox et al.'s conjecture is false, meaning that at least one of these two conjectures must be false. For the case when $R(5, 5) = 43$, we show lower and upper bounds for the Gallai Ramsey number $gr_{k}(K_{3} : K_5)$., Comment: 38 pages, 4 tables, 1 figure

Published

2019

16. Gallai-Ramsey numbers for fans

Author

Mao, Yaping, Wang, Zhao, Magnant, Colton, and Schiermeyer, Ingo

Published

2023

17. Gallai—Ramsey Number for the Union of Stars

Author

Mao, Ya Ping, Wang, Zhao, Magnant, Colton, and Schiermeyer, Ingo

Published

2022

18. Ramsey and Gallai-Ramsey numbers for two classes of unicyclic graphs

Author

Wang, Zhao, Mao, Yaping, Magnant, Colton, and Zou, Jinyu

Subjects

Mathematics - Combinatorics, 05C55

Abstract

Given a graph $G$ and a positive integer $k$, define the \emph{Gallai-Ramsey number} to be the minimum number of vertices $n$ such that any $k$-edge coloring of $K_n$ contains either a rainbow (all different colored) triangle or a monochromatic copy of $G$. In this paper, we consider two classes of unicyclic graphs, the star with an extra edge and the path with a triangle at one end. We provide the $2$-color Ramsey numbers for these two classes of graphs and use these to obtain general upper and lower bounds on the Gallai-Ramsey numbers., Comment: 17 pages. arXiv admin note: text overlap with arXiv:1802.04930

Published

2018

19. Gallai-Ramsey numbers of odd cycles

Author

Wang, Zhao, Mao, Yaping, Magnant, Colton, Sciermeyer, Ingo, and Zou, Jinyu

Subjects

Mathematics - Combinatorics, 05C15

Abstract

Given two graphs $G$ and $H$ and a positive integer $k$, the $k$-color Gallai-Ramsey number, denoted by $gr_{k}(G : H)$, is the minimum integer $N$ such that for all $n \geq N$, every $k$-coloring of the edges of $K_{n}$ contains either a rainbow copy of $G$ or a monochromatic copy of $H$. We prove that $gr_{k} (K_{3} : C_{2\ell + 1}) = \ell \cdot 2^{k} + 1$ for all $k \geq 1$ and $\ell \geq 3$.

Published

2018

20. Gallai-Ramsey numbers for books

Author

Zou, Jinyu, Mao, Yaping, Magnant, Colton, Wang, Zhao, and Ye, Chengfu

Subjects

Mathematics - Combinatorics, 05C55

Abstract

Given a graph $G$ and a positive integer $k$, the \emph{Gallai-Ramsey number} is defined to be the minimum number of vertices $n$ such that any $k$-edge coloring of $K_n$ contains either a rainbow (all different colored) triangle or a monochromatic copy of $G$. In this paper, we obtain general upper and lower bounds on the Gallai-Ramsey numbers for books $B_{m} = K_{2} + \overline{K_{m}}$ and prove sharp results for $m \leq 5$., Comment: 24 pages, 4 figures

Published

2018

21. Gallai-Ramsey Results for Other Rainbow Subgraphs

Author

Magnant, Colton, Salehi Nowbandegani, Pouria, Bellomo, Nicola, Series Editor, Benzi, Michele, Series Editor, Jorgensen, Palle, Series Editor, Li, Tatsien, Series Editor, Melnik, Roderick, Series Editor, Scherzer, Otmar, Series Editor, Steinberg, Benjamin, Series Editor, Reichel, Lothar, Series Editor, Tschinkel, Yuri, Series Editor, Yin, George, Series Editor, Zhang, Ping, Series Editor, Magnant, Colton, and Salehi Nowbandegani, Pouria

Published

2020

22. Conclusion and Open Problems

Author

Magnant, Colton, Salehi Nowbandegani, Pouria, Bellomo, Nicola, Series Editor, Benzi, Michele, Series Editor, Jorgensen, Palle, Series Editor, Li, Tatsien, Series Editor, Melnik, Roderick, Series Editor, Scherzer, Otmar, Series Editor, Steinberg, Benjamin, Series Editor, Reichel, Lothar, Series Editor, Tschinkel, Yuri, Series Editor, Yin, George, Series Editor, Zhang, Ping, Series Editor, Magnant, Colton, and Salehi Nowbandegani, Pouria

Published

2020

23. Gallai-Ramsey Results for Rainbow Triangles

Author

Magnant, Colton, Salehi Nowbandegani, Pouria, Bellomo, Nicola, Series Editor, Benzi, Michele, Series Editor, Jorgensen, Palle, Series Editor, Li, Tatsien, Series Editor, Melnik, Roderick, Series Editor, Scherzer, Otmar, Series Editor, Steinberg, Benjamin, Series Editor, Reichel, Lothar, Series Editor, Tschinkel, Yuri, Series Editor, Yin, George, Series Editor, Zhang, Ping, Series Editor, Magnant, Colton, and Salehi Nowbandegani, Pouria

Published

2020

24. Introduction and Basic Definitions

Author

Magnant, Colton, Salehi Nowbandegani, Pouria, Bellomo, Nicola, Series Editor, Benzi, Michele, Series Editor, Jorgensen, Palle, Series Editor, Li, Tatsien, Series Editor, Melnik, Roderick, Series Editor, Scherzer, Otmar, Series Editor, Steinberg, Benjamin, Series Editor, Reichel, Lothar, Series Editor, Tschinkel, Yuri, Series Editor, Yin, George, Series Editor, Zhang, Ping, Series Editor, Magnant, Colton, and Salehi Nowbandegani, Pouria

Published

2020

25. General Structure Under Forbidden Rainbow Subgraphs

Author

Magnant, Colton, Salehi Nowbandegani, Pouria, Bellomo, Nicola, Series Editor, Benzi, Michele, Series Editor, Jorgensen, Palle, Series Editor, Li, Tatsien, Series Editor, Melnik, Roderick, Series Editor, Scherzer, Otmar, Series Editor, Steinberg, Benjamin, Series Editor, Reichel, Lothar, Series Editor, Tschinkel, Yuri, Series Editor, Yin, George, Series Editor, Zhang, Ping, Series Editor, Magnant, Colton, and Salehi Nowbandegani, Pouria

Published

2020

26. All partitions have small parts - Gallai-Ramsey numbers of bipartite graphs

Author

Wu, Haibo, Magnant, Colton, Nowbandegani, Pouria Salehi, and Xia, Suman

Subjects

Mathematics - Combinatorics

Abstract

Gallai-colorings are edge-colored complete graphs in which there are no rainbow triangles. Within such colored complete graphs, we consider Ramsey-type questions, looking for specified monochromatic graphs. In this work, we consider monochromatic bipartite graphs since the numbers are known to grow more slowly than for non-bipartite graphs. The main result shows that it suffices to consider only $3$-colorings which have a special partition of the vertices. Using this tool, we find several sharp numbers and conjecture the sharp value for all bipartite graphs. In particular, we determine the Gallai-Ramsey numbers for all bipartite graphs with two vertices in one part and initiate the study of linear forests.

Published

2017

27. Tight Nordhaus-Gaddum-type upper bound for total-rainbow connection number of graphs

Author

Li, Wenjing, Li, Xueliang, Magnant, Colton, and Zhang, Jingshu

Subjects

Mathematics - Combinatorics, 05C15, 05C35, 05C38, 05C40

Abstract

A graph is said to be \emph{total-colored} if all the edges and the vertices of the graph are colored. A total-colored graph is \emph{total-rainbow connected} if any two vertices of the graph are connected by a path whose edges and internal vertices have distinct colors. For a connected graph $G$, the \emph{total-rainbow connection number} of $G$, denoted by $trc(G)$, is the minimum number of colors required in a total-coloring of $G$ to make $G$ total-rainbow connected. In this paper, we first characterize the graphs having large total-rainbow connection numbers. Based on this, we obtain a Nordhaus-Gaddum-type upper bound for the total-rainbow connection number. We prove that if $G$ and $\overline{G}$ are connected complementary graphs on $n$ vertices, then $trc(G)+trc(\overline{G})\leq 2n$ when $n\geq 6$ and $trc(G)+trc(\overline{G})\leq 2n+1$ when $n=5$. Examples are given to show that the upper bounds are sharp for $n\geq 5$. This completely solves a conjecture in [Y. Ma, Total rainbow connection number and complementary graph, Results in Mathematics 70(1-2)(2016), 173-182]., Comment: 20 pages

Published

2017

28. Total rainbow connection of digraphs

Author

Lei, Hui, Liu, Henry, Magnant, Colton, and Shi, Yongtang

Subjects

Mathematics - Combinatorics

Abstract

An edge-coloured path is rainbow if its edges have distinct colours. For a connected graph $G$, the rainbow connection number (resp. strong rainbow connection number) of $G$ is the minimum number of colours required to colour the edges of $G$ so that, any two vertices of $G$ are connected by a rainbow path (resp. rainbow geodesic). These two graph parameters were introduced by Chartrand, Johns, McKeon and Zhang in 2008. Krivelevich and Yuster generalised this concept to the vertex-coloured setting. Similarly, Liu, Mestre and Sousa introduced the version which involves total-colourings. Dorbec, Schiermeyer, Sidorowicz and Sopena extended the concept of the rainbow connection to digraphs. In this paper, we consider the (strong) total rainbow connection number of digraphs. Results on the (strong) total rainbow connection number of biorientations of graphs, tournaments and cactus digraphs are presented., Comment: 29 pages, 4 figures. arXiv admin note: text overlap with arXiv:1701.04280

Published

2017

29. Gallai-Ramsey Number for Complete Graphs

Author

Magnant, Colton, Schiermeyer, Ingo, Nešetřil, Jaroslav, editor, Perarnau, Guillem, editor, Rué, Juanjo, editor, and Serra, Oriol, editor

Published

2021

30. Generalized Rainbow Connection of Graphs

Author

Zhu, Xiaoyu, Wei, Meiqin, and Magnant, Colton

Published

2021

31. Distance proper connection of graphs and their complements

Author

Li, Xueliang, Magnant, Colton, Wei, Meiqin, and Zhu, Xiaoyu

Subjects

Mathematics - Combinatorics, 05C15, 05C40

Abstract

Let $G$ be an edge-colored connected graph. A path $P$ in $G$ is called a distance $\ell$-proper path if no two edges of the same color can appear with less than $\ell$ edges in between on $P$. The graph $G$ is called $(k,\ell)$-proper connected if there is an edge-coloring such that every pair of distinct vertices of $G$ are connected by $k$ pairwise internally vertex-disjoint distance $\ell$-proper paths in $G$. The minimum number of colors needed to make $G$ $(k,\ell)$-proper connected is called the $(k,\ell)$-proper connection number of $G$ and denoted by $pc_{k,\ell}(G)$. In this paper we first focus on the $(1,2)$-proper connection number of $G$ depending on some constraints of $\overline G$. Then, we characterize the graphs of order $n$ with $(1,2)$-proper connection number $n-1$ or $n-2$. Using this result, we investigate the Nordhaus-Gaddum-Type problem of $(1,2)$-proper connection number and prove that $pc_{1,2}(G)+pc_{1,2}(\overline{G})\leq n+2$ for connected graphs $G$ and $\overline{G}$. The equality holds if and only if $G$ or $\overline{G}$ is isomorphic to a double star., Comment: 16 pages. arXiv admin note: text overlap with arXiv:1606.06547

Published

2016

32. Distance proper connection of graphs

Author

Li, Xueliang, Magnant, Colton, Wei, Meiqin, and Zhu, Xiaoyu

Subjects

Mathematics - Combinatorics, 05C15, 05C40

Abstract

Let $G$ be an edge-colored connected graph. A path $P$ in $G$ is called a distance $\ell$-proper path if no two edges of the same color appear with fewer than $\ell$ edges in between on $P$. The graph $G$ is called $(k,\ell)$-proper connected if every pair of distinct vertices of $G$ are connected by $k$ pairwise internally vertex-disjoint distance $\ell$-proper paths in $G$. For a $k$-connected graph $G$, the minimum number of colors needed to make $G$ $(k,\ell)$-proper connected is called the $(k,\ell)$-proper connection number of $G$ and denoted by $pc_{k,\ell}(G)$. In this paper, we prove that $pc_{1,2}(G)\leq 5$ for any $2$-connected graph $G$. Considering graph operations, we find that $3$ is a sharp upper bound for the $(1,2)$-proper connection number of the join and the Cartesian product of almost all graphs. In addition, we find some basic properties of the $(k,\ell)$-proper connection number and determine the values of $pc_{1,\ell}(G)$ where $G$ is a traceable graph, a tree, a complete bipartite graph, a complete multipartite graph, a wheel, a cube or a permutation graph of a nontrivial traceable graph., Comment: 18 pages

Published

2016

33. The unbroken spectrum of type-A Frobenius seaweeds

Author

Coll Jr., Vincent E., Hyatt, Matthew, and Magnant, Colton

Subjects

Mathematics - Rings and Algebras, 17B20, 05E15

Abstract

If $\mathfrak{g}$ is a Frobenius Lie algebra, then for certain $F\in \mathfrak{g}^*$ the natural map $\mathfrak{g}\longrightarrow \mathfrak{g}^* $ given by $x \longmapsto F[x,-]$ is an isomorphism. The inverse image of $F$ under this isomorphism is called a principal element. We show that if $\mathfrak{g}$ is a Frobenius seaweed subalgebra of $A_{n-1}=\mathfrak{sl}(n)$ then the spectrum of the adjoint of a principal element consists of an unbroken set of integers whose multiplicities have a symmetric distribution. Our proof methods are constructive and combinatorial in nature.

Published

2016

34. The $(k,\ell)$-proper index of graphs

Author

Chang, Hong, Li, Xueliang, Magnant, Colton, and Qin, Zhongmei

Subjects

Mathematics - Combinatorics, 05C15, 05C40, 05C80, 05D40

Abstract

A tree $T$ in an edge-colored graph is called a {\it proper tree} if no two adjacent edges of $T$ receive the same color. Let $G$ be a connected graph of order $n$ and $k$ be an integer with $2\leq k \leq n$. For $S\subseteq V(G)$ and $|S| \ge 2$, an $S$-tree is a tree containing the vertices of $S$ in $G$. Suppose $\{T_1,T_2,\ldots,T_\ell\}$ is a set of $S$-trees, they are called \emph{internally disjoint} if $E(T_i)\cap E(T_j)=\emptyset$ and $V(T_i)\cap V(T_j)=S$ for $1\leq i\neq j\leq \ell$. For a set $S$ of $k$ vertices of $G$, the maximum number of internally disjoint $S$-trees in $G$ is denoted by $\kappa(S)$. The $\kappa$-connectivity $\kappa_k(G)$ of $G$ is defined by $\kappa_k(G)=\min\{\kappa(S)\mid S$ is a $k$-subset of $V(G)\}$. For a connected graph $G$ of order $n$ and for two integers $k$ and $\ell$ with $2\le k\le n$ and $1\leq \ell \leq \kappa_k(G)$, the \emph{$(k,\ell)$-proper index $px_{k,\ell}(G)$} of $G$ is the minimum number of colors that are needed in an edge-coloring of $G$ such that for every $k$-subset $S$ of $V(G)$, there exist $\ell$ internally disjoint proper $S$-trees connecting them. In this paper, we show that for every pair of positive integers $k$ and $\ell$ with $k \ge 3$, there exists a positive integer $N_1=N_1(k,\ell)$ such that $px_{k,\ell}(K_n) = 2$ for every integer $n \ge N_1$, and also there exists a positive integer $N_2=N_2(k,\ell)$ such that $px_{k,\ell}(K_{m,n}) = 2$ for every integer $n \ge N_2$ and $m=O(n^r) (r \ge 1)$. In addition, we show that for every $p \ge c\sqrt[k]{\frac{\log_a n}{n}}$ ($c \ge 5$), $px_{k,\ell}(G_{n,p})\le 2$ holds almost surely, where $G_{n,p}$ is the Erd\"{o}s-R\'{e}nyi random graph model., Comment: 14 pages

Published

2016

35. Bounds on the connected forcing number of a graph

Author

Davila, Randy, Henning, Michael, Magnant, Colton, and Pepper, Ryan

Subjects

Mathematics - Combinatorics

Abstract

In this paper, we study (zero) forcing sets which induce connected subgraphs of a graph. The minimum cardinality of such a set is called the connected forcing number of the graph. We provide sharp upper and lower bounds on the connected forcing number in terms of the minimum degree, maximum degree, girth, and order of the graph.

Published

2016

36. On two conjectures about the proper connection number of graphs

Author

Huang, Fei, Li, Xueliang, Qin, Zhongmei, Magnant, Colton, and Ozeki, Kenta

Subjects

Mathematics - Combinatorics, 05C15, 05C40

Abstract

A path in an edge-colored graph is called proper if no two consecutive edges of the path receive the same color. For a connected graph $G$, the proper connection number $pc(G)$ of $G$ is defined as the minimum number of colors needed to color its edges so that every pair of distinct vertices of $G$ are connected by at least one proper path in $G$. In this paper, we consider two conjectures on the proper connection number of graphs. The first conjecture states that if $G$ is a noncomplete graph with connectivity $\kappa(G) = 2$ and minimum degree $\delta(G)\ge 3$, then $pc(G) = 2$, posed by Borozan et al.~in [Discrete Math. 312(2012), 2550-2560]. We give a family of counterexamples to disprove this conjecture. However, from a result of Thomassen it follows that 3-edge-connected noncomplete graphs have proper connection number 2. Using this result, we can prove that if $G$ is a 2-connected noncomplete graph with $diam(G)=3$, then $pc(G) = 2$, which solves the second conjecture we want to mention, posed by Li and Magnant in [Theory \& Appl. Graphs 0(1)(2015), Art.2]., Comment: 10 pages. arXiv admin note: text overlap with arXiv:1601.04162

Published

2016

37. Symplectic meanders

Author

Coll, Jr., Vincent E., Hyatt, Matthew, and Magnant, Colton

Subjects

Mathematics - Rings and Algebras, Mathematics - Representation Theory

Abstract

Analogous to the sl(n) case, we address the computation of the index of seaweed subalgebras of sp(2n) by introducing graphical representations called symplectic meanders. Formulas for the algebra's index may be computed by counting the connected components of its associated meander. In certain cases, formulas for the index can be given in terms of elementary functions.

Published

2016

38. Solution to a conjecture on the proper connection number of graphs

Author

Huang, Fei, Li, Xueliang, Qin, Zhongmei, and Magnant, Colton

Subjects

Mathematics - Combinatorics, 05C15, 05C40, 05C07

Abstract

A path in an edge-colored graph is called a proper path if no two adjacent edges of the path receive the same color. For a connected graph $G$, the proper connection number $pc(G)$ of $G$ is defined as the minimum number of colors needed to color its edges, so that every pair of distinct vertices of $G$ is connected by at least one proper path in $G$. Recently, Li and Magnant in [Theory Appl. Graphs 0(1)(2015), Art.2] posed the following conjecture: If $G$ is a connected noncomplete graph of order $n \geq 5$ and minimum degree $\delta(G) \geq n/4$, then $pc(G)=2$. In this paper, we show that this conjecture is true except for two small graphs on 7 and 8 vertices, respectively. As a byproduct we obtain that if $G$ is a connected bipartite graph of order $n\geq 4$ with $\delta(G)\geq \frac{n+6}{8}$, then $pc(G)=2$., Comment: 15 pages

Published

2016

39. Other Generalizations

Author

Li, Xueliang, Magnant, Colton, Qin, Zhongmei, Bellomo, Nicola, Series Editor, Benzi, Michele, Series Editor, Jorgensen, Palle, Series Editor, Li, Tatsien, Series Editor, Melnik, Roderick, Series Editor, Scherzer, Otmar, Series Editor, Steinberg, Benjamin, Series Editor, Reichel, Lothar, Series Editor, Tschinkel, Yuri, Series Editor, Yin, George, Series Editor, Zhang, Ping, Series Editor, Li, Xueliang, Magnant, Colton, and Qin, Zhongmei

Published

2018

40. Proper Vertex Connection and Total Proper Connection

Author

Li, Xueliang, Magnant, Colton, Qin, Zhongmei, Bellomo, Nicola, Series Editor, Benzi, Michele, Series Editor, Jorgensen, Palle, Series Editor, Li, Tatsien, Series Editor, Melnik, Roderick, Series Editor, Scherzer, Otmar, Series Editor, Steinberg, Benjamin, Series Editor, Reichel, Lothar, Series Editor, Tschinkel, Yuri, Series Editor, Yin, George, Series Editor, Zhang, Ping, Series Editor, Li, Xueliang, Magnant, Colton, and Qin, Zhongmei

Published

2018

41. Domination Conditions

Author

Li, Xueliang, Magnant, Colton, Qin, Zhongmei, Bellomo, Nicola, Series Editor, Benzi, Michele, Series Editor, Jorgensen, Palle, Series Editor, Li, Tatsien, Series Editor, Melnik, Roderick, Series Editor, Scherzer, Otmar, Series Editor, Steinberg, Benjamin, Series Editor, Reichel, Lothar, Series Editor, Tschinkel, Yuri, Series Editor, Yin, George, Series Editor, Zhang, Ping, Series Editor, Li, Xueliang, Magnant, Colton, and Qin, Zhongmei

Published

2018

42. Operations on Graphs

Author

Li, Xueliang, Magnant, Colton, Qin, Zhongmei, Bellomo, Nicola, Series Editor, Benzi, Michele, Series Editor, Jorgensen, Palle, Series Editor, Li, Tatsien, Series Editor, Melnik, Roderick, Series Editor, Scherzer, Otmar, Series Editor, Steinberg, Benjamin, Series Editor, Reichel, Lothar, Series Editor, Tschinkel, Yuri, Series Editor, Yin, George, Series Editor, Zhang, Ping, Series Editor, Li, Xueliang, Magnant, Colton, and Qin, Zhongmei

Published

2018

43. Proper k-Connection and Strong Proper Connection

Author

Li, Xueliang, Magnant, Colton, Qin, Zhongmei, Bellomo, Nicola, Series Editor, Benzi, Michele, Series Editor, Jorgensen, Palle, Series Editor, Li, Tatsien, Series Editor, Melnik, Roderick, Series Editor, Scherzer, Otmar, Series Editor, Steinberg, Benjamin, Series Editor, Reichel, Lothar, Series Editor, Tschinkel, Yuri, Series Editor, Yin, George, Series Editor, Zhang, Ping, Series Editor, Li, Xueliang, Magnant, Colton, and Qin, Zhongmei

Published

2018

44. Random Graphs

Author

Li, Xueliang, Magnant, Colton, Qin, Zhongmei, Bellomo, Nicola, Series Editor, Benzi, Michele, Series Editor, Jorgensen, Palle, Series Editor, Li, Tatsien, Series Editor, Melnik, Roderick, Series Editor, Scherzer, Otmar, Series Editor, Steinberg, Benjamin, Series Editor, Reichel, Lothar, Series Editor, Tschinkel, Yuri, Series Editor, Yin, George, Series Editor, Zhang, Ping, Series Editor, Li, Xueliang, Magnant, Colton, and Qin, Zhongmei

Published

2018

45. General Results

Author

Li, Xueliang, Magnant, Colton, Qin, Zhongmei, Bellomo, Nicola, Series Editor, Benzi, Michele, Series Editor, Jorgensen, Palle, Series Editor, Li, Tatsien, Series Editor, Melnik, Roderick, Series Editor, Scherzer, Otmar, Series Editor, Steinberg, Benjamin, Series Editor, Reichel, Lothar, Series Editor, Tschinkel, Yuri, Series Editor, Yin, George, Series Editor, Zhang, Ping, Series Editor, Li, Xueliang, Magnant, Colton, and Qin, Zhongmei

Published

2018

46. Connectivity Conditions

Author

Li, Xueliang, Magnant, Colton, Qin, Zhongmei, Bellomo, Nicola, Series Editor, Benzi, Michele, Series Editor, Jorgensen, Palle, Series Editor, Li, Tatsien, Series Editor, Melnik, Roderick, Series Editor, Scherzer, Otmar, Series Editor, Steinberg, Benjamin, Series Editor, Reichel, Lothar, Series Editor, Tschinkel, Yuri, Series Editor, Yin, George, Series Editor, Zhang, Ping, Series Editor, Li, Xueliang, Magnant, Colton, and Qin, Zhongmei

Published

2018

47. Directed Graphs

Author

Li, Xueliang, Magnant, Colton, Qin, Zhongmei, Bellomo, Nicola, Series Editor, Benzi, Michele, Series Editor, Jorgensen, Palle, Series Editor, Li, Tatsien, Series Editor, Melnik, Roderick, Series Editor, Scherzer, Otmar, Series Editor, Steinberg, Benjamin, Series Editor, Reichel, Lothar, Series Editor, Tschinkel, Yuri, Series Editor, Yin, George, Series Editor, Zhang, Ping, Series Editor, Li, Xueliang, Magnant, Colton, and Qin, Zhongmei

Published

2018

48. Introduction

Author

Li, Xueliang, Magnant, Colton, Qin, Zhongmei, Bellomo, Nicola, Series Editor, Benzi, Michele, Series Editor, Jorgensen, Palle, Series Editor, Li, Tatsien, Series Editor, Melnik, Roderick, Series Editor, Scherzer, Otmar, Series Editor, Steinberg, Benjamin, Series Editor, Reichel, Lothar, Series Editor, Tschinkel, Yuri, Series Editor, Yin, George, Series Editor, Zhang, Ping, Series Editor, Li, Xueliang, Magnant, Colton, and Qin, Zhongmei

Published

2018

49. Ramsey and Gallai-Ramsey Number for Wheels

Author

Mao, Yaping, Wang, Zhao, Magnant, Colton, and Schiermeyer, Ingo

Published

2022

50. Ramsey and Gallai–Ramsey numbers for stars with extra independent edges

Author

Mao, Yaping, Wang, Zhao, Magnant, Colton, and Schiermeyer, Ingo

Published

2020