Local density matrices of many-body states in the constant weight subspaces

Abstract

Let V=k=1N Vk be the N spin-j Hilbert space with d=2j+1-dimensional single particle space. We fix an orthonormal basis \|mi\ for each Vk, with weight mi∈ \-j,… j\. Let V(w) be the subspace of V with a constant weight w, with an orthonormal basis \|m1,…,mN\ subject to Σk mk=w. We show that the combinatorial properties of the constant weight condition imposes strong constraints on the reduced density matrices for any vector | in the constant weight subspace, which limits the possible entanglement structures of |. Our results find applications in the overlapping quantum marginal problems, quantum error-correcting codes, and the spin-network structures in quantum gravity.