# Recurrence relations for Mellin transforms of $GL(n,\mathbb{R})$   Whittaker functions

**Authors:** Eric Stade, Tien D. Trinh

arXiv: 1812.11681 · 2020-05-12

## TL;DR

This paper develops recursive relations for the Mellin transforms of $GL(n,R)$ Whittaker functions, especially for $n=4$, to analyze poles, residues, and applications in automorphic forms and number theory.

## Contribution

It introduces explicit recurrence relations for Mellin transforms of $GL(n,R)$ Whittaker functions, with new relations involving positive shifts for $n=4$, aiding in understanding poles and residues.

## Key findings

- Derived recursive formulas for $T_{n,a}(s)$ for all $n",
- ,
- ,

## Abstract

Using a recursive formula for the Mellin transform $T_{n,a}(s)$ of a spherical, principal series $GL(n,\mathbb{R})$ Whittaker function, we develop an explicit recurrence relation for this Mellin transform. This relation, for any $n\ge2$, expresses $T_{n,a}(s)$ in terms of a number of "shifted" transforms $T_{n,a}(s+\Sigma)$, with each coordinate of $\Sigma$ being a non-negative integer.   We then focus on the case $n=4$. In this case, we use the relation referenced above to derive further relations, each of which involves "strictly positive shifts" in one of the coordinates of $s$. More specifically: each of our new relations expresses $T_{4,a}(s)$ in terms of $T_{4,a}(s+\Sigma)$ and $T_{4,a}(s+\Omega)$, where for some $1\le k\le 3$, the $k$th coordinates of both $\Sigma$ and $\Omega$ are strictly positive.   Finally, we deduce a recurrence relation for $T_{4,a}(s)$ involving strictly positive shifts in all three $s_k$'s at once. (That is, the condition "for some $1\le k\le 3$" above becomes "for all $1\le k\le 3$.")   These additional relations on $GL(4,\mathbb{R})$ may be applied to the explicit understanding of certain poles and residues of $T_{4,a}(s)$. This residue information is, as we describe below, in turn relevant to work of Goldfeld and Woodbury, concerning orthogonality of Fourier coefficients of $SL(4,\mathbb{R})$ Maass forms, and the $GL(4)$ Kuznetsov formula.

## Full text

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## References

24 references — full list in the complete paper: https://tomesphere.com/paper/1812.11681/full.md

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Source: https://tomesphere.com/paper/1812.11681