Global Completability with Applications to Self-Consistent Quantum Tomography

Abstract

Let p1, ..., pN ∈ RD be unknown vectors and let Omega ⊂eq 1,...,N× 2. Assume that the inner products piT pj are fixed for all (i,j) ∈ Omega. Do these inner product constraints (up to simultaneous rotation of all vectors) determine p1, ..., pN uniquely? Here we derive a necessary and sufficient condition for the uniqueness of p1, ...,pN (i.e., global completability) which is applicable to a large class of practically relevant sets Omega. Moreover, given Omega, we show that the condition for global completability is universal in the sense that for almost all vectors p1, ...,pN ∈ RD the completability of p1, ...,pN only depends on Omega and not on the specific values of piT pj$ for (i,j) ∈ Omega. This work was motivated by practical considerations, namely, self-consistent quantum tomography.