Abundance: Asymmetric Graph Removal Lemmas and Integer Solutions to Linear Equations
Abstract
We prove that a large family of pairs of graphs satisfy a polynomial dependence in asymmetric graph removal lemmas. In particular, we give an unexpected answer to a question of Gishboliner, Shapira, and Wigderson by showing that for every t ≥slant 4, there are Kt-abundant graphs of chromatic number t. Using similar methods, we also extend work of Ruzsa by proving that a set A ⊂ \1,…,N\ which avoids solutions with distinct integers to an equation of genus at least two has size O(N). The best previous bound was N1 - o(1) and the exponent of 1/2 is best possible in such a result. Finally, we investigate the relationship between polynomial dependencies in asymmetric removal lemmas and the problem of avoiding integer solutions to equations. The results suggest a potentially deep correspondence. Many open questions remain.
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