Littlewood polynomial mathematics , a Littlewood polynomial Littlewood's problem asks how large the values of such a polynomial must be on the unit circle in the complex plane . The answer to this would yield information about the autocorrelation of binary sequences.1950s .Definition A polynomialLittlewood polynomial if all the. Littlewood's problem asks for constants c 1 and c 2 such that there are infinitely many Littlewood polynomials p n increasing degree n satisfyingunit circle . The Rudin–Shapiro polynomials provide a sequence satisfying the upper bound with. In 2019 , an infinite family of Littlewood polynomials satisfying both the upper and lower bound was constructed by Paul Balister, Béla Bollobás , Robert Morris , Julian Sahasrabudhe, and Marius Tiba .
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