On the zeros of reciprocal Littlewood polynomials
Abstract
Let P(z)=Σn=0Nanzn be a Littlewood polynomial of degree N, meaning that an∈\ 1\. We say that P is reciprocal if P(z)=zNP(1/z). Borwein, Erd\'elyi and Littmann posed the question of determining the minimum number ZL(N) of zeros of modulus 1 of a reciprocal Littlewood polynomial P of degree N. Several finite lower bounds on ZL(N) have been obtained in the literature, and it has been conjectured by various authors that ZL(N) must in fact grow to infinity with N. Starting from ideas in recent breakthrough papers of Erd\'elyi and Sahasrabudhe, we are able to confirm this.
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