A Non-Linear Roth Theorem for Fractals of Sufficiently Large Dimension
Abstract
Suppose that d ≥ 2, and that A ⊂ [0,1] has sufficiently large dimension, 1 - εd < H(A) < 1. Then for any polynomial P of degree d with no constant term, there exists a point configuration \ x, x-t,x-P(t) \ ⊂ A with t ≈P 1.
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