On Lerch's formula and zeros of the quadrilateral zeta function

Abstract

Let 0 < a 1/2 and define the quadrilateral zeta function by 2Q(s,a) := ζ (s,a) + ζ (s,1-a) + Lis (e2π ia) + Lis(e2π i(1-a)), where ζ (s,a) is the Hurwitz zeta function and Lis (e2π ia) is the periodic zeta function. In the present paper, we show that there exists a unique real number a0 ∈ (0,1/2) such that Q(σ, a0) has a unique double real zero at σ = 1/2 when σ ∈ (0,1), for any a ∈ (a0,1/2], the function Q(σ, a) has no zero in the open interval σ ∈ (0,1) and for any a ∈ (0,a0), the function Q(σ, a) has at least two real zeros in σ ∈ (0,1). Moreover, we prove that Q(s,a) has infinitely many complex zeros in the region of absolute convergence and the critical strip when a ∈ Q (0,1/2) \1/6, 1/4, 1/3\. The Lerch formula, Hadamard product formula, Riemann-von Mangoldt formula for Q(s,a) are also shown.