Bipartite cuts in Ramsey-Turán style
Abstract
We prove that every K5-free n-vertex graph with sublinear independence number can be made bipartite by removing at most n2(1/18+o(1)) edges, where the constant 1/18 is best possible. The proof method is related to extensions of Turán Theorem in edge-weighted settings, and part of the proof uses flag algebra.
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