Balancing Polynomials in the Chebyshev Norm

Abstract

Given n polynomials p1, …, pn of degree at most n with \|pi\|∞ 1 for i ∈ [n], we show there exist signs x1, …, xn ∈ \-1,1\ so that \[\|Σi=1n xi pi\|∞ < 30n, \] where \|p\|∞ := |x| 1 |p(x)|. This result extends the Rudin-Shapiro sequence, which gives an upper bound of O(n) for the Chebyshev polynomials T1, …, Tn, and can be seen as a polynomial analogue of Spencer's "six standard deviations" theorem.