On the Modes of Polynomials Derived from Nondecreasing Sequences

Abstract

Wang and Yeh proved that if P(x) is a polynomial with nonnegative and nondecreasing coefficients, then P(x+d) is unimodal for any d>0. A mode of a unimodal polynomial f(x)=a0+a1x+·s + amxm is an index k such that ak is the maximum coefficient. Suppose that M*(P,d) is the smallest mode of P(x+d), and M*(P,d) the greatest mode. Wang and Yeh conjectured that if d2>d1>0, then M*(P,d1)≥ M*(P,d2) and M*(P,d1)≥ M*(P,d2). We give a proof of this conjecture.