An approximation algorithm for the longest cycle problem in solid grid graphs

February 25, 2015 Β· Declared Dead Β· πŸ› Discrete Applied Mathematics

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Authors Asghar Asgharian Sardroud, Alireza Bagheri arXiv ID 1502.07085 Category cs.DS: Data Structures & Algorithms Cross-listed cs.DM, math.CO Citations 10 Venue Discrete Applied Mathematics Last Checked 4 months ago
Abstract
Although, the Hamiltonicity of solid grid graphs are polynomial-time decidable, the complexity of the longest cycle problem in these graphs is still open. In this paper, by presenting a linear-time constant-factor approximation algorithm, we show that the longest cycle problem in solid grid graphs is in APX. More precisely, our algorithm finds a cycle of length at least $\frac{2n}{3}+1$ in 2-connected $n$-node solid grid graphs. Keywords: Longest cycle, Hamiltonian cycle, Approximation algorithm, Solid grid graph.
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