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Knots, links, and long-range magic

Jackson R. Fliss

2021Journal of High Energy Physics15 citationsDOIOpen Access PDF

Abstract

A bstract We study the extent to which knot and link states (that is, states in 3d Chern-Simons theory prepared by path integration on knot and link complements) can or cannot be described by stabilizer states. States which are not classical mixtures of stabilizer states are known as “magic states” and play a key role in quantum resource theory. By implementing a particular magic monotone known as the “mana” we quantify the magic of knot and link states. In particular, for SU(2) k Chern-Simons theory we show that knot and link states are generically magical. For link states, we further investigate the mana associated to correlations between separate boundaries which characterizes the state’s long-range magic. Our numerical results suggest that the magic of a majority of link states is entirely long-range. We make these statements sharper for torus links.

Topics & Concepts

MAGIC (telescope)PhysicsKnot (papermaking)Link (geometry)TorusKnot theoryJones polynomialTheoretical physicsQuantum invariantKnot invariantMonotone polygonQuantum mechanicsF-theoryPure mathematicsPath integral formulationTrefoil knotMathematical physicsPath (computing)Quantum many-body systemsTopological Materials and PhenomenaGeometric and Algebraic Topology