# Kuznetsov, Petersson and Weyl on $GL(3)$, II: The generalized principal   series forms

**Authors:** Jack Buttcane

arXiv: 1706.08816 · 2019-09-09

## TL;DR

This paper develops a Kuznetsov trace formula for generalized principal series Maass forms on $GL(3)$, establishing their existence and properties, and extending the analytic tools available for studying automorphic forms beyond self-dual cases.

## Contribution

It introduces a Kuznetsov trace formula for these forms, proves an arithmetically-weighted Weyl law, and demonstrates the existence of non-self-dual forms, expanding the analytic framework for $GL(3)$ automorphic forms.

## Key findings

- Established the existence of non-self-dual Maass forms on $GL(3)$
- Developed a Kuznetsov trace formula for these forms
- Proved an arithmetically-weighted Weyl law

## Abstract

This paper initiates the study by analytic methods of the generalized principal series Maass forms on $GL(3)$. These forms occur as an infinite sequence of one-parameter families in the two-parameter spectrum of $GL(3)$ Maass forms, analogous to the relationship between the holomorphic modular forms and the spherical Maass cusp forms on $GL(2)$. We develop a Kuznetsov trace formula attached to these forms at each weight and use it to prove an arithmetically-weighted Weyl law, demonstrating the existence of forms which are not self-dual. Previously, the only such forms that were known to exist were the self-dual forms arising from symmetric-squares of $GL(2)$ forms. The Kuznetsov formula developed here should take the place of the $GL(2)$ Petersson trace formula for theorems "in the weight aspect". As before, the construction involves evaluating the Archimedian local zeta integral for the Rankin-Selberg convolution and proving a form of Kontorovich-Lebedev inversion.

## Full text

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Source: https://tomesphere.com/paper/1706.08816