Homotopical characterization of strong contextuality (part II)

Abstract: Simplicial distributions introduced in the paper “Simplicial quantum contextuality” provide a topological approach to the study of contextuality for collections of probability distributions. The space of measurements and the space of outcomes are represented by simplicial sets, so one can ask what is the role of the homotopy theory of simplicial sets here. In this talk, we will give a homotopical characterization of strongly contextual simplicial distributions with binary outcomes, specifically those defined on the cone of a 1-dimensional space. To prove this, we introduce the corresponding category for simplicial distribution on the cone of a 1-dimensional space and give the characterization of strong contextuality in terms of this category.

algebraic topologycategory theorygroup theoryK-theory and homology

Audience: researchers in the topic

Bilkent Topology Seminar

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Recordings of talks available at www.youtube.com/channel/UCLrmyGpqxyeVpTcA1b5HcMw/videos