On a conjecture for trigonometric sums by S. Koumandos and S. Ruscheweyh

Abstract

S. Koumandos and S. Ruscheweyh posed the following conjecture: For ∈(0,1] and 0<μ≤μ(), the partial sum snμ(z)=Σk=0n (μ)kk!zk, 0<μ≤1, |z|<1, satisfies % align* (1-z)snμ(z) (1+z1-z), n∈ N, align* where μ() is the unique solution of align* ∫0(+1)π (t-π)tμ-1dt=0. align* This conjecture is already settled for =12, 14, 34 and =1. In this work, we validate this conjecture for an open neighbourhood of =13 and in a weaker form for =23. The particular value of the conjecture leads to several consequences related to starlike functions.