On Approximability of Satisfiable k-CSPs: VII
Abstract
Let 1,…,k be finite alphabets, and let μ be a distribution over 1 × … × k in which the probability of each atom is at least α. We prove that if μ does not admit Abelian embeddings, and fi: i C are 1-bounded functions (for i=1,…,k) such that \[ |E(x1,…,xk) μ n[f1(x1) … fk(xk)]| ≥ , \] then there exists L 1n of degree at most d and \|L\|2≤ 1 such that | f1, L|≥ δ, where d and δ>0 depend only on k, α and . This answers the analytic question posed by Bhangale, Khot, and Minzer (STOC 2022). We also prove several extensions of this result that are useful in subsequent applications.
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