Faster Approximation for Maximum Independent Set on Unit Disk Graph


Abstract in English

Maximum independent set from a given set $D$ of unit disks intersecting a horizontal line can be solved in $O(n^2)$ time and $O(n^2)$ space. As a corollary, we design a factor 2 approximation algorithm for the maximum independent set problem on unit disk graph which takes both time and space of $O(n^2)$. The best known factor 2 approximation algorithm for this problem runs in $O(n^2 log n)$ time and takes $O(n^2)$ space [Jallu and Das 2016, Das et al. 2016].

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