Abstract
Abstract
In this note, we study the Li coefficients
$\lambda _{n,a}$
for the quadrilateral zeta function. Furthermore, we give an arithmetic and asymptotic formula for these coefficients. Especially, we show that for any fixed
$n \in {\mathbb {N}}$
, there exists
$a>0$
such that
$\lambda _{2n-1,a}> 0$
and
$\lambda _{2n,a} < 0$
.
Publisher
Canadian Mathematical Society