Your search keyword '"Wu, Tingzeng"' showing total 4 results

1. On complexity of structure and substructure connectivity, component connectivity and restricted connectivity of graphs

Author

Lü, Huazhong, Wu, Tingzeng, Lü, Huazhong, and Wu, Tingzeng

Abstract

The connectivity of a graph is an important parameter to measure its reliability. Structure and substructure connectivity, component connectivity and $k$-restricted connectivity are well-known generalizations of the concept of connectivity, which have been extensively studied from the combinatorial point of view. Very little result is known about their complexity other than the recently obtained computational complexity of $k$-restricted edge-connectivity. In this paper, we zero in on characterizing the complexity of structure and substructure connectivity, component connectivity and $k$-restricted connectivity of graphs, showing that they are all NP-complete.

Published

2021

2. Unpaired many-to-many disjoint path cover of balanced hypercubes

Author

Lü, Huazhong, Wu, Tingzeng, Lü, Huazhong, and Wu, Tingzeng

Abstract

The balanced hypercube $BH_n$, a variant of the hypercube, was proposed as a desired interconnection network topology. It is known that $BH_n$ is bipartite. Assume that $S=\{s_1,s_2,\cdots,s_{2n-2}\}$ and $T=\{t_1,t_2,\cdots,t_{2n-2}\}$ are any two sets of vertices in different partite sets of $BH_n$ ($n\geq2$). It has been proved that there exists paired 2-disjoint path cover of $BH_n$. In this paper, we prove that there exists unpaired $(2n-2)$-disjoint path cover of $BH_n$ ($n\geq2$) from $S$ to $T$, which improved some known results. The upper bound $2n-2$ of the number of disjoint paths in unpaired $(2n-2)$-disjoint path cover is best possible., Comment: arXiv admin note: text overlap with arXiv:1804.01949

Published

2019

3. Super edge-connectivity and matching preclusion of data center networks

Author

Lü, Huazhong, Wu, Tingzeng, Lü, Huazhong, and Wu, Tingzeng

Abstract

Edge-connectivity is a classic measure for reliability of a network in the presence of edge failures. $k$-restricted edge-connectivity is one of the refined indicators for fault tolerance of large networks. Matching preclusion and conditional matching preclusion are two important measures for the robustness of networks in edge fault scenario. In this paper, we show that the DCell network $D_{k,n}$ is super-$\lambda$ for $k\geq2$ and $n\geq2$, super-$\lambda_2$ for $k\geq3$ and $n\geq2$, or $k=2$ and $n=2$, and super-$\lambda_3$ for $k\geq4$ and $n\geq3$. Moreover, as an application of $k$-restricted edge-connectivity, we study the matching preclusion number and conditional matching preclusion number, and characterize the corresponding optimal solutions of $D_{k,n}$. In particular, we have shown that $D_{1,n}$ is isomorphic to the $(n,k)$-star graph $S_{n+1,2}$ for $n\geq2$., Comment: 20 pages, 1 figure

Published

2018

4. Structure and substructure connectivity of balanced hypercubes

Author

Lü, Huazhong, Wu, Tingzeng, Lü, Huazhong, and Wu, Tingzeng

Abstract

The connectivity of a network directly signifies its reliability and fault-tolerance. Structure and substructure connectivity are two novel generalizations of the connectivity. Let $H$ be a subgraph of a connected graph $G$. The structure connectivity (resp. substructure connectivity) of $G$, denoted by $\kappa(G;H)$ (resp. $\kappa^s(G;H)$), is defined to be the minimum cardinality of a set $F$ of connected subgraphs in $G$, if exists, whose removal disconnects $G$ and each element of $F$ is isomorphic to $H$ (resp. a subgraph of $H$). In this paper, we shall establish both $\kappa(BH_n;H)$ and $\kappa^s(BH_n;H)$ of the balanced hypercube $BH_n$ for $H\in\{K_1,K_{1,1},K_{1,2},K_{1,3},C_4\}$., Comment: arXiv admin note: text overlap with arXiv:1805.08461

Published

2018