Universal Subspaces for Local Unitary Groups of Fermionic Systems

Abstract

Let V=N V be the N-fermion Hilbert space with M-dimensional single particle space V and 2N M. We refer to the unitary group G of V as the local unitary (LU) group. We fix an orthonormal (o.n.) basis v1,...,vM of V. Then the Slater determinants ei1,...,iN:= vi1 vi2... viN with i1<...<iN form an o.n. basis of . Let ⊂eq be the subspace spanned by all ei1,...,iN such that the set \i1,...,iN\ contains no pair \2k-1,2k\, k an integer. We say that the ∈ are single occupancy states (with respect to the basis v1,...,vM). We prove that for N=3 the subspace is universal, i.e., each G-orbit in meets , and that this is false for N>3. If M is even, the well known BCS states are not LU-equivalent to any single occupancy state. Our main result is that for N=3 and M even there is a universal subspace ⊂eq spanned by M(M-1)(M-5)/6 states ei1,...,iN. Moreover the number M(M-1)(M-5)/6 is minimal.