Pure state `really' informationally complete with rank-1 POVM

Abstract

What is the minimal number of elements in a rank-1 positive-operator-valued measure (POVM) which can uniquely determine any pure state in d-dimensional Hilbert space Hd? The known result is that the number is no less than 3d-2. We show that this lower bound is not tight except for d=2 or 4. Then we give an upper bound of 4d-3. For d=2, many rank-1 POVMs with four elements can determine any pure states in H2. For d=3, we show eight is the minimal number by construction. For d=4, the minimal number is in the set of \10,11,12,13\. We show that if this number is greater than 10, an unsettled open problem can be solved that three orthonormal bases can not distinguish all pure states in H4. For any dimension d, we construct d+2k-2 adaptive rank-1 positive operators for the reconstruction of any unknown pure state in Hd, where 1 k d.