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Inducing Whittaker Functions from Higher Ranks

Number Theory 2026-05-29 v1

Abstract

We construct a family of Whittaker functions for SL(m,Z)SL(m,\mathbb{Z}) induced directly from Whittaker functions for SL(n,Z)SL(n,\mathbb{Z}), for any 2m<n2 \leq m<n. Given Jacquet's Whittaker function Wα,N(n)W_{\alpha,N}^{(n)} on the generalized upper half-plane hn\mathfrak{h}^n, we show that the function Vα,N(m):hmCV_{\alpha,N}^{(m)}:\mathfrak{h}^m\to\mathbb{C} defined by restricting Wα,N(n)W_{\alpha,N}^{(n)} to the block-diagonal embedding hmhn\mathfrak{h}^m\hookrightarrow\mathfrak{h}^n is a Whittaker function for SL(m,Z)SL(m,\mathbb{Z}), provided the Langlands parameters α=(αi)1in\alpha=(\alpha_i)_{1\leq i\leq n} satisfy i=1mαi=m(mn)/2\sum_{i=1}^m\alpha_i = m(m-n)/2. Under this condition, the induced function carries Langlands parameters (αi+nm2)1im\bigl(\alpha_i+\frac{n-m}{2}\bigr)_{1\leq i\leq m} and inherits the first m1m-1 entries of the character tuple of Wα,N(n)W_{\alpha,N}^{(n)}. This result complements the propagation formulas of Ishii and Stade, which relate Whittaker functions on GL(n,R)GL(n,\mathbb{R}) to those on GL(n1,R)GL(n-1,\mathbb{R}) and GL(n2,R)GL(n-2,\mathbb{R}). In contrast, our construction passes directly from GL(n,R)GL(n,\mathbb{R}) to GL(m,R)GL(m,\mathbb{R}) for any m<nm < n in a single step.

Cite

@article{arxiv.2605.29342,
  title  = {Inducing Whittaker Functions from Higher Ranks},
  author = {Vishal Muthuvel},
  journal= {arXiv preprint arXiv:2605.29342},
  year   = {2026}
}

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9 pages