Abstract
Abstract
In this paper we consider the sup-norm problem in the context of analytic Eisenstein series for
{\mathrm{GL}_{2}}
over number fields. We prove a hybrid bound which is sharper than the corresponding bound for Maaß forms.
Our results generalize those of Huang and Xu where the case of Eisenstein series of square-free levels over the base field
{\operatorname{\mathbb{Q}}}
had been considered.
Subject
Applied Mathematics,General Mathematics
Cited by
7 articles.
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