Approximations by special values of multiple cosine and sine functions

Abstract

Kurokawa and Koyama's multiple cosine function Cr(x) and Kurokawa's multiple sine function Sr(x) are generalizations of the classical cosine and sine functions from their infinite product representations, respectively. For any fixed x∈[0,12), let B=\r(x)π~~|~~r=1,2,3,…\ and C=\ Sr(x)π~~|~~r=1,2,3,…\ be the sets of special values of Cr(x) and Sr(x) at x, respectively. In this paper, we will show that the real numbers can be strongly approximated by linear combinations of elements in B and C respectively, with rational coefficients. Furthermore, let D=\ζE(3)π2,ζE(5)π4, …, ζE(2k+1)π2k,…; β(4)π3,β(6)π5, …, β(2k+2)π2k+1,…\ be the set of special values of Dirichlet's eta and beta functions. We will prove that the set D has a similar approximation property, where the coefficients are values of the derivatives of rational polynomials. Our approaches are inspired by recent works of Alkan (Proc. Amer. Math. Soc. 143: 3743--3752, 2015) and Lupu-Wu (J. Math. Anal. Appl. 545: Article ID 129144, 2025) as applications of the trigonometric integrals.