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arxiv: 1106.2351 · v1 · pith:D3AQGZ6Gnew · submitted 2011-06-12 · 💻 cs.DS

On vertex covers and matching number of trapezoid graphs

classification 💻 cs.DS
keywords numbercoverstrapezoidvertexcalculatingcomplexitygraphgraphs
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The intersection graph of a collection of trapezoids with corner points lying on two parallel lines is called a trapezoid graph. Using binary indexed tree data structure, we improve algorithms for calculating the size and the number of minimum vertex covers (or independent sets), as well as the total number of vertex covers, and reduce the time complexity from $O (n^2)$ to $O (n \log n)$, where $n$ is the number of trapezoids. Furthermore, we present the family of counterexamples for recently proposed algorithm with time complexity $O (n^2)$ for calculating the maximum cardinality matching in trapezoid graphs.

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