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405 results on '"Shao Zehui"'

1. On the Star Chromatic Index of Generalized Petersen Graphs

Author

Zhu Enqiang and Shao Zehui

Subjects
star edge-coloring, star chromatic index, generalized petersen graph, 05c15, Mathematics, QA1-939
Abstract

The star k-edge-coloring of graph G is a proper edge coloring using k colors such that no path or cycle of length four is bichromatic. The minimum number k for which G admits a star k-edge-coloring is called the star chromatic index of G, denoted by χ′s (G). Let GCD(n, k) be the greatest common divisor of n and k. In this paper, we give a necessary and sufficient condition of χ′s (P (n, k)) = 4 for a generalized Petersen graph P (n, k) and show that “almost all” generalized Petersen graphs have a star 5-edge-colorings. Furthermore, for any two integers k and n (≥2k + 1) such that GCD(n, k) ≥ 3, P (n, k) has a star 5-edge-coloring, with the exception of the case that GCD(n, k) = 3, k ≠ GCD(n, k) and n3≡1(mod3){n \over 3} \equiv 1\left( {\bmod 3} \right).

Published
2021
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2. On the maximum ABC index of bipartite graphs without pendent vertices

Author

Shao Zehui, Wu Pu, Jiang Huiqin, Sheikholeslami S.M., and Wang Shaohui

Subjects
degree (of vertex), atom–bond connectivity index, bipartite graph, extremal graph, incidence energy, Chemistry, QD1-999
Abstract

For a simple graph G, the atom–bond connectivity index (ABC) of G is defined as ABC(G) = ∑uv∈ E(G)d(u)+d(v)−2d(u)d(v), $\sum_{uv\in{}E(G)} \sqrt{\frac{d(u)+d(v)-2}{d(u)d(v)}},$where d(v) denotes the degree of vertex v of G. In this paper, we prove that for any bipartite graph G of order n ≥ 6, size 2n − 3 with δ(G) ≥ 2, ABC(G)≤ 2(n−6)+23(n−2)n−3+2, $ABC(G)\leq{}\sqrt{2}(n-6)+2\sqrt{\frac{3(n-2)}{n-3}}+2,$and we characterize all extreme bipartite graphs.

Published
2020
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3. The Sanskruti index of trees and unicyclic graphs

Author

Deng Fei, Jiang Huiqin, Liu Jia-Bao, Poklukar Darja Rupnik, Shao Zehui, Wu Pu, and Žerovnik Janez

Subjects
topological index, molecular descriptor, sanskruti index, tree, unicyclic graph, 05c90, 05c05, 92e10, Chemistry, QD1-999
Abstract

The Sanskruti index of a graph G is defined as S(G)=∑uv∈E(G)sG(u)sG(v)sG(u)+sG(v)−23,$$\begin{align*}S(G)=\sum_{uv\in{}E(G)}{\left(\frac{s_G(u)s_G(v)}{s_G(u)+s_G(v)-2}\right)}^3, \end{align*}$$where sG(u) is the sum of the degrees of the neighbors of a vertex u in G. Let Pn, Cn, Sn and Sn + e be the path, cycle, star and star plus an edge of n vertices, respectively. The Sanskruti index of a molecular graph of a compounds can model the bioactivity of compounds, has a strong correlation with entropy of octane isomers and its prediction power is higher than many existing topological descriptors.

Published
2019
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4. On The Co-Roman Domination in Graphs

Author

Shao Zehui, Sheikholeslami Seyed Mahmoud, Soroudi Marzieh, Volkmann Lutz, and Liu Xinmiao

Subjects
co-roman dominating function, co-roman domination number, roman domination, 05c69, Mathematics, QA1-939
Abstract

Let G = (V, E) be a graph and let f : V (G) → {0, 1, 2} be a function. A vertex v is said to be protected with respect to f, if f(v) > 0 or f(v) = 0 and v is adjacent to a vertex of positive weight. The function f is a co-Roman dominating function if (i) every vertex in V is protected, and (ii) each v ∈ V with positive weight has a neighbor u ∈ V with f(u) = 0 such that the function fuv : V → {0, 1, 2}, defined by fuv(u) = 1, fuv(v) = f(v) − 1 and fuv(x) = f(x) for x ∈ V \ {v, u}, has no unprotected vertex. The weight of f is ω(f) = ∑v∈V f(v). The co-Roman domination number of a graph G, denoted by γcr(G), is the minimum weight of a co-Roman dominating function on G. In this paper, we give a characterization of graphs of order n for which co-Roman domination number is 2n3${{2n} \over 3}$ or n − 2, which settles two open problem in [S. Arumugam, K. Ebadi and M. Manrique, Co-Roman domination in graphs, Proc. Indian Acad. Sci. Math. Sci. 125 (2015) 1–10]. Furthermore, we present some sharp bounds on the co-Roman domination number.

Published
2019
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5. Matrix Multiplication with Less Arithmetic Complexity and IO Complexity

Author

Wu, Pu, Jiang, Huiqing, Shao, Zehui, and Xu, Jin

Subjects
Computer Science - Symbolic Computation, Computer Science - Discrete Mathematics, 68R01, F.2.1, I.1.2
Abstract

After Strassen presented the first sub-cubic matrix multiplication algorithm, many Strassen-like algorithms are presented. Most of them with low asymptotic cost have large hidden leading coefficient which are thus impractical. To reduce the leading coefficient, Cenk and Hasan give a general approach reducing the leading coefficient of $<2,2,2;7>$-algorithm to $5$ but increasing IO complexity. In 2017, Karstadt and Schwartz also reduce the leading coefficient of $<2,2,2;7>$-algorithm to $5$ by the Alternative Basis Matrix Multiplication method. Meanwhile, their method reduces the IO complexity and low-order monomials in arithmetic complexity. In 2019, Beniamini and Schwartz generalize Alternative Basis Matrix Multiplication method reducing leading coefficient in arithmetic complexity but increasing IO complexity. In this paper, we propose a new matrix multiplication algorithm which reduces leading coefficient both in arithmetic complexity and IO complexity. We apply our method to Strassen-like algorithms improving arithmetic complexity and IO complexity (the comparison with previous results are shown in Tables 1 and 2). Surprisingly, our IO complexity of $<3,3,3;23>$-algorithm is $14n^{\log_323}M^{-\frac{1}{2}} + o(n^{\log_323})$ which breaks Ballard's IO complexity low bound ($\Omega(n^{\log_323}M^{1-\frac{\log_323}{2}})$) for recursive Strassen-like algorithms., Comment: 24 pages and one figure

Published
2022

6. On a generalization of fractional Langevin equation

Author

Kosari, Saeed, Yadollahzadeh, Milad, Shao, Zehui, and Rao, Yongsheng

Subjects
Mathematics - Analysis of PDEs
Abstract

In this work, we consider a generalization of the nonlinear Langevin equation of fractional orders with boundary value conditions. The existence and uniqueness of solutions are studied by using results of the fixed point theory. Moreover, the previous results of fractional Langevin equations are a special case of our problem.

Published
2020

7. On the packing coloring of base-3 Sierpi\'{n}ski and $H$ graphs

Author

Deng, Fei, Shao, Zehui, and Vesel, Aleksander

Subjects
Mathematics - Combinatorics
Abstract

For a nondecreasing sequence of integers $S=(s_1, s_2, \ldots)$ an $S$-packing $k$-coloring of a graph $G$ is a mapping from $V(G)$ to $\{1, 2,\ldots,k\}$ such that vertices with color $i$ have pairwise distance greater than $s_i$. By setting $s_i = d + \lfloor \frac{i-1}{n} \rfloor$ we obtain a $(d,n)$-packing coloring of a graph $G$. The smallest integer $k$ for which there exists a $(d,n)$-packing coloring of $G$ is called the $(d,n)$-packing chromatic number of $G$. In the special case when $d$ and $n$ are both equal to one we speak of the packing chromatic number of $G$. We determine the packing chromatic number of the base-3 Sierpi\'{n}ski graphs $S_k$ and provide new results on $(d,n)$-packing chromatic colorings, $d \le 2$, for this class of graphs. By using a dynamic algorithm, we establish the packing chromatic number for $H$-graphs $H(r)$.

Published
2019

8. Outer independent double Roman domination number of graphs

Author

Mojdeh, Doost Ali, Samadi, Babak, Shao, Zehui, and Yero, Ismael G.

Subjects
Mathematics - General Mathematics
Abstract

A double Roman dominating function of a graph $G$ is a function $f:V(G)\rightarrow \{0,1,2,3\}$ having the property that for each vertex $v$ with $f(v)=0$, there exists $u\in N(v)$ with $f(u)=3$, or there are $u,w\in N(v)$ with $f(u)=f(w)=2$, and if $f(v)=1$, then $v$ is adjacent to a vertex assigned at least $2$ under $f$. The double Roman domination number $\gamma_{dR}(G)$ is the minimum weight $f(V(G))=\sum_{v\in V(G)}f(v)$ among all double Roman dominating functions of $G$. An outer independent double Roman dominating function is a double Roman dominating function $f$ for which the set of vertices assigned $0$ under $f$ is independent. The outer independent double Roman domination number $\gamma_{oidR}(G)$ is the minimum weight taken over all outer independent double Roman dominating functions of $G$. In this work, we present some contributions to the study of outer independent double Roman domination in graphs. Characterizations of the families of all connected graphs with small outer independent double Roman domination numbers, and tight lower and upper bounds on this parameter are given. We moreover bound this parameter for a tree $T$ from below by two times the vertex cover number of $T$ plus one. We also prove that the decision problem associated with $\gamma_{oidR}(G)$ is NP-complete even when restricted to planar graphs with maximum degree at most four. Finally, we give an exact formula for this parameter concerning the corona graphs.

Published
2019
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12. Changing and unchanging 2-rainbow independent domination

Author

Wu, Pu, Shao, Zehui, Samodivkin, Vladimir, Sheikholeslami, S. M., Soroudi, M., and Wang, Shaohui

Subjects
Mathematics - Combinatorics
Abstract

For a function $f : V(G ) \rightarrow \{0, 1, 2\}$ we denote by $V_i$ the set of vertices to which the value $i$ is assigned by $f$, i.e. $V_i = \{ x \in V (G ) : f(x ) = i \}$. If a function $f: V(G) \rightarrow \{0,1,2\}$ satisfying the condition that $V_i$ is independent for $i \in \{1,2\}$ and every vertex $u$ for which $f(u) = 0$ is adjacent to at least one vertex $v$ for which $f(v) = i$ for each $i \in \{1,2\}$, then $f$ is called a 2-rainbow independent dominating function (2RiDF). The weight $w(f)$ of a 2RiDF $f$ is the value $w(f) = |V_1|+|V_2|$. The minimum weight of a 2RiDF on a graph $G$ is called the \emph{2-rainbow independent domination number} of $G$. A graph $G$ is 2-rainbow independent domination stable if the 2-rainbow independent domination number of $G$ remains unchanged under removal of any vertex. In this paper, we characterize 2-rainbow independent domination stable trees and we study the effect of edge removal on 2-rainbow independent domination number in trees.

Published
2018

13. The characterization of perfect Roman domination stable trees

Author

Li, Zepeng, Shao, Zehui, Rao, Yongsheng, Wu, Pu, and Wang, Shaohui

Subjects
Mathematics - Combinatorics
Abstract

A \emph{perfect Roman dominating function} (PRDF) on a graph $G = (V, E)$ is a function $f : V \rightarrow \{0, 1, 2\}$ satisfying the condition that every vertex $u$ for which $f(u) = 0$ is adjacent to exactly one vertex $v$ for which $f(v) = 2$. The weight of a PRDF is the value $w(f) = \sum_{u \in V}f(u)$. The minimum weight of a PRDF on a graph $G$ is called the \emph{perfect Roman domination number $\gamma_R^p(G)$} of $G$. A graph $G$ is perfect Roman domination domination stable if the perfect Roman domination number of $G$ remains unchanged under the removal of any vertex. In this paper, we characterize all trees that are perfect Roman domination stable.

Published
2018

16. On maximal Roman domination in graphs: complexity and algorithms

Author

Shao, Zehui, Song, Yonghao, Liu, Qiyun, Duan, Zhixing, Jiang, Huiqin, Shao, Zehui, Song, Yonghao, Liu, Qiyun, Duan, Zhixing, and Jiang, Huiqin

Abstract

For a simple undirected connected graph G= (V, E), a maximal Roman dominating function (MRDF) of Gis a function f: V(G) → {0, 1, 2} with the following properties: (i) For every vertex v∈ {v∈ V|f(v) = 0}, there exists a vertex u∈ N(v) such that f(u) = 2. (ii) The set {v∈ V|f(v) = 0} is not a dominating set of G; In other words, there exists a vertex v∈ {v∈ V|f(v) ≠ 0} such that N(v) ∩ {u∈ V|f(u) = 0} ∅. The weight of an MRDF of Gis the sum of its function values over all vertices, denoted as f(G) = ∑v∈V(G)f(v), and the maximal Roman domination number of G, denoted by γmR(G), is the minimum weight of an MRDF of G. In this paper, we establish some bounds of the maximal Roman domination number of graphs. Additionally, we develop an integer linear programming formulation to compute the maximal Roman domination number of any graph. Furthermore, we prove that maximal Roman domination problem (MRD) is NP-complete even restricted to star convex bipartite graphs and chordal bipartite graphs. Lastly, we show the maximal Roman domination number of threshold graphs, trees, and block graphs can be computed in linear time.

Published
2024
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23. Tree-colorable maximal planar graphs

Author

Zhu, Enqiang, Li, Zepeng, Shao, Zehui, and Xu, Jin

Subjects
Mathematics - Combinatorics
Abstract

A tree-coloring of a maximal planar graph is a proper vertex $4$-coloring such that every bichromatic subgraph, induced by this coloring, is a tree. A maximal planar graph $G$ is tree-colorable if $G$ has a tree-coloring. In this article, we prove that a tree-colorable maximal planar graph $G$ with $\delta(G)\geq 4$ contains at least four odd-vertices. Moreover, for a tree-colorable maximal planar graph of minimum degree 4 that contains exactly four odd-vertices, we show that the subgraph induced by its four odd-vertices is not a claw and contains no triangles., Comment: 18pages,10figures

Published
2014

24. Size of edge-critical uniquely 3-colorable planar graphs

Author

Li, Zepeng, Zhu, Enqiang, Shao, Zehui, and Xu, Jin

Subjects
Mathematics - Combinatorics
Abstract

A graph $G$ is \emph{uniquely k-colorable} if the chromatic number of $G$ is $k$ and $G$ has only one $k$-coloring up to permutation of the colors. A uniquely $k$-colorable graph $G$ is edge-critical if $G-e$ is not a uniquely $k$-colorable graph for any edge $e\in E(G)$. Mel'nikov and Steinberg [L. S. Mel'nikov, R. Steinberg, One counterexample for two conjectures on three coloring, Discrete Math. 20 (1977) 203-206] asked to find an exact upper bound for the number of edges in a edge-critical 3-colorable planar graph with $n$ vertices. In this paper, we give some properties of edge-critical uniquely 3-colorable planar graphs and prove that if $G$ is such a graph with $n(\geq6)$ vertices, then $|E(G)|\leq \frac{5}{2}n-6 $, which improves the upper bound $\frac{8}{3}n-\frac{17}{3}$ given by Matsumoto [N. Matsumoto, The size of edge-critical uniquely 3-colorable planar graphs, Electron. J. Combin. 20 (3) (2013) $\#$P49]. Furthermore, we find some edge-critical 3-colorable planar graphs which have $n(=10,12, 14)$ vertices and $\frac{5}{2}n-7$ edges., Comment: 17pages,5figures

Published
2013

45. New results of uncertain integrals and applications.

Author

Shao, Zehui, Kosari, Saeed, Yadollahzadeh, Milad, and Beikaee, Seyed Abdollah

Subjects
*INTEGRALS, *DYNAMICAL systems, *DIFFERENTIAL equations, *FRACTIONAL integrals, *INTEGRAL inequalities
Abstract

Based on the uncertainty theory, Liu [B. Liu, Some research problems in uncertainty theory, J. Uncertain Syst. 3 2009, 1, 3–10] introduced an uncertain integral for applying uncertain differential equation, finance, control, filtering and dynamical systems. Since uncertain integrals are the important content of uncertainty theory, this paper explores an approach of the relationship between uncertain integrals by the well-known Chebyshev-type inequality. Also, we propose the concept of an uncertain fractional integral which is generalized version of an uncertain integral. The definition of a strong comonotonic uncertain process and some new properties of the uncertain integral were presented in [C. You and N. Xiang, Some properties of uncertain integral, Iran. J. Fuzzy Syst. 15 2018, 2, 133–142]. Based on the strong comonotonic uncertain process, as an application, we provide Chebyshev's inequality for a fractional uncertain integral and an uncertain integral. [ABSTRACT FROM AUTHOR]

Published
2023
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