The Newman algorithm for constructing polynomials with restricted coefficients and many real roots
Abstract
Under certain natural sufficient conditions on the sequence of uniformly bounded closed sets Ek⊂R of admissible coefficients, we construct a polynomial Pn(x)=1+Σk=1nk xk, k∈ Ek, with at least cn distinct roots in [0,1], which matches the classical upper bound up to the value of the constant c>0. Our sufficient conditions cover the Littlewood (Ek=\-1,1\) and Newman (Ek=\0,(-1)k\) polynomials and are also necessary for the existence of such polynomials with arbitrarily many roots in the case when the sequence Ek is periodic.
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