Discrepancy of Arithmetic Progressions in Boxes and Convex Bodies

Abstract

The combinatorial discrepancy of arithmetic progressions inside [N] := \1, …, N\ is the smallest integer D for which [N] can be colored with two colors so that any arithmetic progression in [N] contains at most D more elements from one color class than the other. Bounding the discrepancy of such set systems is a classical problem in discrepancy theory. More recently, this problem was generalized to arithmetic progressions in grids like [N]d (Valk\'o) and [N1]× … × [Nd] (Fox, Xu, and Zhou). In the latter setting, Fox, Xu, and Zhou gave upper and lower bounds on the discrepancy that match within a || || factor, where := [N1]× … × [Nd] is the ground set. In this work, we use the connection between factorization norms and discrepancy to improve their upper bound to be within a || factor from the lower bound. We also generalize Fox, Xu, and Zhou's lower bound, and our upper bounds to arithmetic progressions in arbitrary convex bodies.

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