A Convergent Inflation Hierarchy for Quantum Causal Structures

Abstract: A causal structure is a description of the functional dependencies between random variables. A distribution is compatible with a given causal structure if it can be realized by a process respecting these dependencies. Deciding whether a distribution is compatible with a structure is a practically and fundamentally relevant, yet very difficult problem. Only recently has a general class of algorithms been proposed: These so-called inflation techniques associate to any causal structure a hierarchy of increasingly… Show more

“…Classical rigidity of TC distributions implies a unique possible jΨ ðξÞ ij j 2 and enforces Eq. (11). ▪ RGB4 distribution.-To illustrate the power of these results, we now consider quantum nonlocal distributions P Q ða; b; cÞ (with outcomes a; b; c ∈ f0; 2; 1 0 ; 1 1 g) on the triangle of Ref.…”

“…Characterizing classical and quantum correlations in such networks is a highly challenging task; see, e.g., Refs. [6][7][8][9][10][11].…”

Partial Self-Testing and Randomness Certification in the Triangle Network

“…Classical rigidity of TC distributions implies a unique possible jΨ ðξÞ ij j 2 and enforces Eq. (11). ▪ RGB4 distribution.-To illustrate the power of these results, we now consider quantum nonlocal distributions P Q ða; b; cÞ (with outcomes a; b; c ∈ f0; 2; 1 0 ; 1 1 g) on the triangle of Ref.…”

“…Characterizing classical and quantum correlations in such networks is a highly challenging task; see, e.g., Refs. [6][7][8][9][10][11].…”

Partial Self-Testing and Randomness Certification in the Triangle Network

State polynomials: positivity, optimization and nonlinear Bell inequalities

The inflation hierarchy and the polarization hierarchy are complete for the quantum bilocal scenario