Maximal Haagerup subalgebras in L(Z2 SL2(Z))

Abstract

We prove that L(SL2(k)) is a maximal Haagerup von Neumann subalgebra in L(k2 SL2(k)) for k=Q. Then we show how to modify the proof to handle k=Z. The key step for the proof is a complete description of all intermediate von Neumann subalgebras between L(SL2(k)) and L∞(Y) SL2(k), where SL2(k) Y denotes the quotient of the algebraic action SL2(k) k2 by modding out the relation φ φ', where φ, φ'∈ k2 and φ'(x, y):=φ(-x, -y) for all (x, y)∈ k2. As a by-product, we show L(PSL2(Q)) is a maximal von Neumann subalgebra in L∞(Y) PSL2(Q); in particular, PSL2(Q) Y is a prime action, i.e. it admits no non-trivial quotient actions.