On a Sine Polynomial of Turan
Abstract
In 1935, P. Tur\'an proved that Sn,a(x)= Σj=1nn+a-j n-j (jx)>0 (n,a∈N; 0<x<π). We present various related inequalities. Among others, we show that the refinements S2n-1,a(x)≥ (x) and S2n,a(x)≥ 2(x)(1+(x)) are valid for all integers n≥ 1 and real numbers a≥ 1 and x∈(0,π). Moreover, we apply our theorems on sine sums to obtain inequalities for the Chebyshev polynomials of the second kind.
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