In mathematics, the theta correspondence or Howe correspondence is a mathematical relation between representations of two groups of a reductive dual pair. The local theta correspondence relates irreducible admissible representations over a local field, while the global theta correspondence relates irreducible automorphic representations over a global field.
The theta correspondence was introduced by Roger Howe in . Its name arose due to its origin in André Weil's representation theoretical formulation of the theory of theta series in . The Shimura correspondence as constructed by Jean-Loup Waldspurger in and may be viewed as an instance of the theta correspondence.
Let
F
2
W
F
Sp(W)
(G,H)
Sp(W)
F
\psi
F
Mp(W)
\psi
\omega\psi
Given the reductive dual pair
(G,H)
Sp(W)
(\widetilde{G},\widetilde{H})
Mp(W)
Mp(W)
Sp(W)
The local theta correspondence is a 1-1 correspondence between certain irreducible admissible representations of
\widetilde{G}
\widetilde{H}
\omega\psi
Mp(W)
\widetilde{G} ⋅ \widetilde{H}
Key properties of local theta correspondence include its compatibility with Bernstein-Zelevinsky induction and conservation relations concerning the first occurrence indices along Witt towers .
Stephen Rallis showed a version of the global Howe duality conjecture for cuspidal automorphic representations over a global field, assuming the validity of the Howe duality conjecture for all local places.
Define
l{R}(\widetilde{G},\omega\psi)
\widetilde{G}
\omega\psi
l{R}(\widetilde{H},\omega\psi)
l{R}(\widetilde{G} ⋅ \widetilde{H},\omega\psi)
The Howe duality conjecture asserts that
l{R}(\widetilde{G} ⋅ \widetilde{H},\omega\psi)
l{R}(\widetilde{G},\omega\psi)
l{R}(\widetilde{H},\omega\psi)
The Howe duality conjecture for archimedean local fields was proved by Roger Howe. For
p
p