# Rank-deficient representations in the Theta correspondence over finite   fields arise from quantum codes

**Authors:** Felipe Montealegre-Mora, David Gross

arXiv: 1906.07230 · 2025-04-08

## TL;DR

This paper explores the decomposition of tensor power representations of symplectic groups over finite fields, revealing connections to quantum codes and orthogonal group representations, and extends classical duality results to a finite field setting.

## Contribution

It demonstrates that rank-deficient components originate from embeddings related to quantum codes, generalizing Howe-Kashiwara-Vergne duality over finite fields.

## Key findings

- Rank-deficient subrepresentations arise from quantum code embeddings.
- Irreducible subrepresentations are labeled by orthogonal group irreps.
- Results apply in odd characteristic and stable range t <= dim V/2.

## Abstract

Let V be a symplectic vector space and let $\mu$ be the oscillator representation of Sp(V). It is natural to ask how the tensor power representation $\mu^{\otimes t}$ decomposes. If V is a real vector space, then Howe-Kashiwara-Vergne (HKV) duality asserts that there is a one-one correspondence between the irreducible subrepresentations of Sp(V) and the irreps of an orthogonal group O(t). It is well-known that this duality fails over finite fields. Addressing this situation, Gurevich and Howe have recently assigned a notion of rank to each Sp(V) representation. They show that a variant of HKV duality continues to hold over finite fields, if one restricts attention to subrepresentations of maximal rank. The nature of the rank-deficient components was left open. Here, we show that all rank-deficient Sp(V)-subrepresentations arise from embeddings of lower-order tensor products of $\mu$ and $\bar\mu$ into $\mu^{\otimes t}$. The embeddings live on spaces that have been studied in quantum information theory as tensor powers of self-orthogonal Calderbank-Shor-Steane (CSS) quantum codes. We then find that the irreducible Sp(V) subrepresentations of $\mu^{\otimes t}$ are labelled by the irreps of orthogonal groups O(r) acting on certain r-dimensional spaces for r <= t. The results hold in odd charachteristic and the "stable range" t <= 1/2 dim V. Our work has implications for the representation theory of the Clifford group. It can be thought of as a generalization of the known characterization of the invariants of the Clifford group in terms of self-dual codes.

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## References

26 references — full list in the complete paper: https://tomesphere.com/paper/1906.07230/full.md

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