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Wyszukujesz frazę "k -rainbow index" wg kryterium: Temat


Wyświetlanie 1-5 z 5
Tytuł:
More on the Minimum Size of Graphs with Given Rainbow Index
Autorzy:
Zhao, Yan
Powiązania:
https://bibliotekanauki.pl/articles/32083808.pdf
Data publikacji:
2020-02-01
Wydawca:
Uniwersytet Zielonogórski. Wydział Matematyki, Informatyki i Ekonometrii
Tematy:
Steiner distance
rainbow S -tree
k -rainbow index
Opis:
The concept of k-rainbow index rxk(G) of a connected graph G, introduced by Chartrand et al., is a natural generalization of the rainbow connection number of a graph. Liu introduced a parameter t(n, k, ℓ) to investigate the problems of the minimum size of a connected graph with given order and k-rainbow index at most ℓ and obtained some exact values and upper bounds for t(n, k, ℓ). In this paper, we obtain some exact values of t(n, k, ℓ) for large ℓ and better upper bounds of t(n, k, ℓ) for small ℓ and k = 3.
Źródło:
Discussiones Mathematicae Graph Theory; 2020, 40, 1; 227-241
2083-5892
Pojawia się w:
Discussiones Mathematicae Graph Theory
Dostawca treści:
Biblioteka Nauki
Artykuł
Tytuł:
Graphs with 3-Rainbow Index n − 1 and n − 2
Autorzy:
Li, Xueliang
Schiermeyer, Ingo
Yang, Kang
Zhao, Yan
Powiązania:
https://bibliotekanauki.pl/articles/31339126.pdf
Data publikacji:
2015-02-01
Wydawca:
Uniwersytet Zielonogórski. Wydział Matematyki, Informatyki i Ekonometrii
Tematy:
rainbow S-tree
k-rainbow index
Opis:
Let $G = (V(G),E(G))$ be a nontrivial connected graph of order $n$ with an edge-coloring $c : E(G) → {1, 2, . . ., q}, q ∈ \mathbb{N}$, where adjacent edges may be colored the same. A tree $T$ in $G$ is a rainbow tree if no two edges of $T$ receive the same color. For a vertex set $S ⊆ V (G)$, a tree connecting $S$ in $G$ is called an $S$-tree. The minimum number of colors that are needed in an edge-coloring of $G$ such that there is a rainbow $S$-tree for each $k$-subset $S$ of $V(G)$ is called the $k$-rainbow index of $G$, denoted by $rx_k(G)$, where $k$ is an integer such that $2 ≤ k ≤ n$. Chartrand et al. got that the $k$-rainbow index of a tree is $n−1$ and the $k$-rainbow index of a unicyclic graph is $n−1$ or $n−2$. So there is an intriguing problem: Characterize graphs with the $k$-rainbow index $n − 1$ and $n − 2$. In this paper, we focus on $k = 3$, and characterize the graphs whose $3$-rainbow index is $n − 1$ and $n − 2$, respectively.
Źródło:
Discussiones Mathematicae Graph Theory; 2015, 35, 1; 105-120
2083-5892
Pojawia się w:
Discussiones Mathematicae Graph Theory
Dostawca treści:
Biblioteka Nauki
Artykuł
Tytuł:
Graphs with 4-Rainbow Index 3 and n − 1
Autorzy:
Li, Xueliang
Schiermeyer, Ingo
Yang, Kang
Zhao, Yan
Powiązania:
https://bibliotekanauki.pl/articles/31339468.pdf
Data publikacji:
2015-05-01
Wydawca:
Uniwersytet Zielonogórski. Wydział Matematyki, Informatyki i Ekonometrii
Tematy:
rainbow S-tree
k-rainbow index
Opis:
Let $G$ be a nontrivial connected graph with an edge-coloring $ c : E(G) \rightarrow $ $ {1, 2, . . ., q}, $ $q \in \mathbb{N} $, where adjacent edges may be colored the same. A tree $T$ in $G$ is called a rainbow tree if no two edges of $T$ receive the same color. For a vertex set $ S \subseteq V (G) $, a tree that connects $S$ in $G$ is called an $S$-tree. The minimum number of colors that are needed in an edge-coloring of $G$ such that there is a rainbow $S$-tree for every set $S$ of $k$ vertices of $V (G)$ is called the $k$-rainbow index of $G$, denoted by $ r x_k (G) $. Notice that a lower bound and an upper bound of the $k$-rainbow index of a graph with order $n$ is $k − 1$ and $n − 1$, respectively. Chartrand et al. got that the $k$-rainbow index of a tree with order $n$ is $n − 1$ and the $k$-rainbow index of a unicyclic graph with order $n$ is $n − 1$ or $n − 2$. Li and Sun raised the open problem of characterizing the graphs of order $n$ with $r x_k (G) = n − 1$ for $ k \ge 3 $. In early papers we characterized the graphs of order $n$ with 3-rainbow index 2 and $n − 1$. In this paper, we focus on $k = 4$, and characterize the graphs of order $n$ with 4-rainbow index 3 and $n − 1$, respectively.
Źródło:
Discussiones Mathematicae Graph Theory; 2015, 35, 2; 387-398
2083-5892
Pojawia się w:
Discussiones Mathematicae Graph Theory
Dostawca treści:
Biblioteka Nauki
Artykuł
Tytuł:
The 3-Rainbow Index of a Graph
Autorzy:
Chen, Lily
Li, Xueliang
Yang, Kang
Zhao, Yan
Powiązania:
https://bibliotekanauki.pl/articles/31339122.pdf
Data publikacji:
2015-02-01
Wydawca:
Uniwersytet Zielonogórski. Wydział Matematyki, Informatyki i Ekonometrii
Tematy:
rainbow tree
S-tree
k-rainbow index
Opis:
Let $G$ be a nontrivial connected graph with an edge-coloring $c : E(G) → {1, 2, . . ., q}, q ∈ ℕ$, where adjacent edges may be colored the same. A tree $T$ in $G$ is a rainbow tree if no two edges of $T$ receive the same color. For a vertex subset $S ⊆ V (G)$, a tree that connects $S$ in $G$ is called an $S$-tree. The minimum number of colors that are needed in an edge-coloring of $G$ such that there is a rainbow $S$-tree for each $k$-subset $S$ of $V(G)$ is called the $k$-rainbow index of $G$, denoted by $rx_k(G)$. In this paper, we first determine the graphs of size $m$ whose 3-rainbow index equals $m$, $m − 1$, $m − 2$ or $2$. We also obtain the exact values of $rx_3(G)$ when $G$ is a regular multipartite complete graph or a wheel. Finally, we give a sharp upper bound for $rx_3(G)$ when $G$ is 2-connected and 2-edge connected. Graphs $G$ for which $rx_3(G)$ attains this upper bound are determined.
Źródło:
Discussiones Mathematicae Graph Theory; 2015, 35, 1; 81-94
2083-5892
Pojawia się w:
Discussiones Mathematicae Graph Theory
Dostawca treści:
Biblioteka Nauki
Artykuł
Tytuł:
The strong 3-rainbow index of some certain graphs and its amalgamation
Autorzy:
Awanis, Zata Yumni
Salman, A.N.M.
Powiązania:
https://bibliotekanauki.pl/articles/2216176.pdf
Data publikacji:
2022
Wydawca:
Akademia Górniczo-Hutnicza im. Stanisława Staszica w Krakowie. Wydawnictwo AGH
Tematy:
amalgamation
rainbow coloring
rainbow Steiner tree
strong k-rainbow index
Opis:
We introduce a strong k-rainbow index of graphs as modification of well-known k-rainbow index of graphs. A tree in an edge-colored connected graph G, where adjacent edge may be colored the same, is a rainbow tree if all of its edges have distinct colors. Let k be an integer with 2 ≤ k ≤ n. The strong k-rainbow index of G, denoted by $srx_k(G)$, is the minimum number of colors needed in an edge-coloring of G so that every k vertices of G is connected by a rainbow tree with minimum size. We focus on k = 3. We determine the strong 3-rainbow index of some certain graphs. We also provide a sharp upper bound for the strong 3-rainbow index of amalgamation of graphs. Additionally, we determine the exact values of the strong 3-rainbow index of amalgamation of some graphs.
Źródło:
Opuscula Mathematica; 2022, 42, 4; 527-547
1232-9274
2300-6919
Pojawia się w:
Opuscula Mathematica
Dostawca treści:
Biblioteka Nauki
Artykuł
    Wyświetlanie 1-5 z 5

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