English

Towards a resolution of the spin alignment problem

Quantum Physics 2024-04-30 v3 Information Theory math.IT

Abstract

Consider minimizing the entropy of a mixture of states by choosing each state subject to constraints. If the spectrum of each state is fixed, we expect that in order to reduce the entropy of the mixture, we should make the states less distinguishable in some sense. Here, we study a class of optimization problems that are inspired by this situation and shed light on the relevant notions of distinguishability. The motivation for our study is the recently introduced spin alignment conjecture. In the original version of the underlying problem, each state in the mixture is constrained to be a freely chosen state on a subset of nn qubits tensored with a fixed state QQ on each of the qubits in the complement. According to the conjecture, the entropy of the mixture is minimized by choosing the freely chosen state in each term to be a tensor product of projectors onto a fixed maximal eigenvector of QQ, which maximally "aligns" the terms in the mixture. We generalize this problem in several ways. First, instead of minimizing entropy, we consider maximizing arbitrary unitarily invariant convex functions such as Fan norms and Schatten norms. To formalize and generalize the conjectured required alignment, we define alignment as a preorder on tuples of self-adjoint operators that is induced by majorization. We prove the generalized conjecture for Schatten norms of integer order, for the case where the freely chosen states are constrained to be classical, and for the case where only two states contribute to the mixture and QQ is proportional to a projector. The last case fits into a more general situation where we give explicit conditions for maximal alignment. The spin alignment problem has a natural "dual" formulation, versions of which have further generalizations that we introduce.

Keywords

Cite

@article{arxiv.2307.06894,
  title  = {Towards a resolution of the spin alignment problem},
  author = {Mohammad A. Alhejji and Emanuel Knill},
  journal= {arXiv preprint arXiv:2307.06894},
  year   = {2024}
}

Comments

v1: 36 pages. v2: includes a no-conflict of interest statement. v3: 39 pages, a revision with streamlined proofs, accepted for publication in Communications in Mathematical Physics. arXiv admin note: substantial text overlap with arXiv:2304.13771

R2 v1 2026-06-28T11:29:38.414Z