Linear programming based approximation algorithms for feedback set problems in bipartite tournaments
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Publication:534571
DOI10.1016/j.tcs.2010.10.047zbMath1216.68344OpenAlexW2115051629MaRDI QIDQ534571
Publication date: 18 May 2011
Published in: Theoretical Computer Science (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.tcs.2010.10.047
Linear programming (90C05) Graph theory (including graph drawing) in computer science (68R10) Approximation algorithms (68W25) Directed graphs (digraphs), tournaments (05C20)
Related Items (5)
Circular convex bipartite graphs: feedback vertex sets ⋮ A polynomial kernel for \textsc{Feedback Arc Set} on bipartite tournaments ⋮ Feedback vertex sets on restricted bipartite graphs ⋮ MINIMUM FEEDBACK ARC SETS IN ROTATOR AND INCOMPLETE ROTATOR GRAPHS ⋮ Vertex deletion on split graphs: beyond 4-hitting set
Cites Work
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- Feedback arc set in bipartite tournaments is NP-complete
- Improved approximation algorithm for the feedback set problem in a bipartite tournament
- Approximating minimum feedback sets and multicuts in directed graphs
- Feedback arc set problem in bipartite tournaments
- An Approximation Algorithm for Feedback Vertex Sets in Tournaments
- Deterministic Pivoting Algorithms for Constrained Ranking and Clustering Problems
- A Min-Max Theorem on Feedback Vertex Sets
- Aggregating inconsistent information
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