Cycles to the Rescue! Novel Constraints to Compute Maximum Planar Subgraphs Fast
June 21, 2018 Β· Declared Dead Β· π Embedded Systems and Applications
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Authors
Markus Chimani, Tilo Wiedera
arXiv ID
1806.08283
Category
cs.DS: Data Structures & Algorithms
Citations
4
Venue
Embedded Systems and Applications
Last Checked
4 months ago
Abstract
The NP-hard Maximum Planar Subgraph problem asks for a planar subgraph $H$ of a given graph $G$ such that $H$ has maximum edge cardinality. For more than two decades, the only known non-trivial exact algorithm was based on integer linear programming and Kuratowski's famous planarity criterion. We build upon this approach and present new constraint classes, together with a lifting of the polyhedron, to obtain provably stronger LP-relaxations, and in turn faster algorithms in practice. The new constraints take Euler's polyhedron formula as a starting point and combine it with considering cycles in $G$. This paper discusses both the theoretical as well as the practical sides of this strengthening.
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