Yury L. Orlovich scite author profile

It is known that all 2-connected, linearly convex triangular grid graphs, with only one exception, are hamiltonian (Reay and Zamfirescu, 2000). In the paper, it is shown that this result holds for a wider class of connected, locally connected triangular grid graphs and, with more exceptions, even for some general class of graphs. It is also shown that the HAMILTONIAN CYCLE problem is NP-complete for triangular grid graphs.

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The complexity of dissociation set problems in graphs

Orlovich

Dolgui

Finke

et al. 2011

Discrete Applied Mathematics

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International audienceA subset of vertices in a graph is called a dissociation set if it induces a subgraph with a vertex degree of at most 1. The maximum dissociation set problem, i.e., the problem of finding a dissociation set of maximum size in a given graph is known to be NP-hard for bipartite graphs. We show that the maximum dissociation set problem is NP-hard for planar line graphs of planar bipartite graphs. In addition, we describe several polynomially solvable cases for the problem under consideration. One of them deals with the subclass of the so-called chair-free graphs. Furthermore, the related problem of finding a maximal (by inclusion) dissociation set of minimum size in a given graph is studied, and NP-hardness results for this problem, namely for weakly chordal and bipartite graphs, are derived. Finally, we provide inapproximability results for the dissociation set problems mentioned above

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Hamiltonian properties of locally connected graphs with bounded vertex degree

Gordon

Orlovich

Potts

et al. 2011

Discrete Applied Mathematics

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Graphs with Maximal Induced Matchings of the Same Size

Baptiste

Kovalyov

Orlovich

et al. 2012

IFAC Proceedings Volumes

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Abstract. A graph is well-indumatched if all its maximal (with respect to set inclusion) induced matchings are of the same size. We first prove that recognizing the class WIM of well-indumatched graphs is a co-NP-complete problem even for (2P5, K1,5)-free graphs. We then show that the well-known decision problems such as Independent Dominating Set, Independent Set, and Dominating Set are NP-complete for well-indumatched graphs. We also show that WIM is a co-indumatching hereditary class and characterize well-indumatched graphs in terms of forbidden co-indumatching subgraphs. However, we prove that recognizing co-indumatching subgraphs is an NP-complete problem. A graph G is perfectly well-indumatched if every induced subgraph of G is well-indumatched. We characterize the class of perfectly well-indumatched graphs in terms of forbidden induced subgraphs. Finally, we show that both Independent Dominating Set and Independent Set can be solved in polynomial time for perfectly well-indumatched graphs, even in their weighted versions, but Dominating Set is still NP-complete.

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Yury L. Orlovich

Hamiltonian properties of triangular grid graphs

The complexity of dissociation set problems in graphs

Hamiltonian properties of locally connected graphs with bounded vertex degree

Graphs with Maximal Induced Matchings of the Same Size

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