Monogamy of entanglement between cones

TL;DR

This paper characterizes the monogamy of entanglement as a property of tensor products of convex cones, linking quantum entanglement to geometric structures and providing conditions for when minimal and k-extendible tensor sets coincide.

Contribution

It generalizes the concept of monogamy of entanglement to convex cones and characterizes when minimal tensor products match k-extendible tensors, especially for polyhedral cones with simplex bases.

Findings

Monogamy of entanglement characterizes minimal tensor products of convex cones.

Minimal tensor product equals k-extendible tensors for certain cones.

Polyhedral cones with bases as products of simplices are key to this equivalence.

Abstract

A separable quantum state shared between parties $A$ and $B$ can be symmetrically extended to a quantum state shared between party $A$ and parties $B_1,\ldots ,B_k$ for every $k\in\mathbf{N}$. Quantum states that are not separable, i.e., entangled, do not have this property. This phenomenon is known as "monogamy of entanglement". We show that monogamy is not only a feature of quantum theory, but that it characterizes the minimal tensor product of general pairs of convex cones $\mathsf{C}_A$ and $\mathsf{C}_B$: The elements of the minimal tensor product $\mathsf{C}_A\otimes_{\min} \mathsf{C}_B$ are precisely the tensors that can be symmetrically extended to elements in the maximal tensor product $\mathsf{C}_A\otimes_{\max} \mathsf{C}^{\otimes_{\max} k}_B$ for every $k\in\mathbf{N}$. Equivalently, the minimal tensor product of two cones is the intersection of the nested sets of $k$-extendible tensors. It is a natural question when the minimal tensor product $\mathsf{C}_A\otimes_{\min} \mathsf{C}_B$ coincides with the set of $k$-extendible tensors for some finite $k$. We show that this is universally the case for every cone $\mathsf{C}_A$ if and only if $\mathsf{C}_B$ is a polyhedral cone with a base given by a product of simplices. Our proof makes use of a new characterization of products of simplices up to affine equivalence that we believe is of independent interest.