English

Inequalities for trigonometric sums

Classical Analysis and ODEs 2023-07-11 v1

Abstract

We present several new inequalities for trigonometric sums. Among others, we show that the inequality k=1n(nk+1)(nk+2)ksin(kx)>29sin(x)(1+2cos(x))2 \sum_{k=1}^n (n-k+1)(n-k+2)k\sin(kx) > \frac{2}{9} \sin(x) \bigl( 1+2\cos(x) \bigr)^2 holds for all n1n\geq 1 and x(0,2π/3)x\in (0, 2\pi/3). The constant factor 2/92/9 is sharp. This refines the classical Szeg\"o-Schweitzer inequality which states that the sine sum is positive for all n1n\geq 1 and x(0,2π/3)x\in (0,2 \pi/3). Moreover, as an application of one of our results, we obtain a two-parameter class of absolutely monotonic functions.

Keywords

Cite

@article{arxiv.2307.04464,
  title  = {Inequalities for trigonometric sums},
  author = {Horst Alzer and Man Kam Kwong},
  journal= {arXiv preprint arXiv:2307.04464},
  year   = {2023}
}
R2 v1 2026-06-28T11:25:49.941Z