Uniform Distribution Modulo 1 and the Universality of Zeta-Functions of Certain Cusp Forms


Antanas Laurinčikas




An universality theorem on the approximation of analytic functions by shifts $\zeta(s+i\tau,F)$ of zeta-functions of normalized Hecke-eigen forms $F$, where $\tau$ takes values from the set $\{k^\alpha h:k=0,1,2,\dots\}$ with fixed $0<\alpha<1$ and $h>0$, is obtained.