Quantum Query Complexity of the Hyperoctahedral Group

Abstract

We determine the quantum query complexity of oracle identification on the hyperoctahedral group BN = \ 1\N SN with respect to the natural representation: QLV(BN) = 2(N-1) for all N 2. This is twice the symmetric-group value QLV(SN) = N-1; the doubling arises from an -parity obstruction that restricts the bottleneck representation sgn(σ) to even tensor powers. The proof combines a reduction to SN Kronecker products via Rademacher moment polynomials with the bipartition distance formula dT(((N),),(α,β)) = 2(N-α1)-|β| in the tensor product graph. A closed-form generating function yields the first-appearance multiplicity (2N-3)!!. We also show Qdecomp() 2\,Qsigned(), with equality on B2, and conjecture a link between the adversary bound and the graph eccentricity.