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The topological symmetric orbifold

Songyuan Li, Jan Troost

2020Journal of High Energy Physics11 citationsDOIOpen Access PDF

Abstract

A bstract We analyze topological orbifold conformal field theories on the symmetric product of a complex surface M . By exploiting the mathematics literature we show that a canonical quotient of the operator ring has structure constants given by Hurwitz numbers. This proves a conjecture in the physics literature on extremal correlators. Moreover, it allows to leverage results on the combinatorics of the symmetric group to compute more structure constants explicitly. We recall that the full orbifold chiral ring is given by a symmetric orbifold Frobenius algebra. This construction enables the computation of topological genus zero and genus one correlators, and to prove the vanishing of higher genus contributions. The efficient description of all topological correlators sets the stage for a proof of a topological AdS/CFT correspondence. Indeed, we propose a concrete mathematical incarnation of the proof, relating Gromow-Witten theory in the bulk to the cohomology of the Hilbert scheme on the boundary.

Topics & Concepts

OrbifoldPhysicsStructure constantsTopology (electrical circuits)CohomologyQuotientTopological quantum field theoryFrobenius algebraConjectureSymmetric groupPure mathematicsGenusMathematicsConformal field theoryHilbert schemeGauge theoryField (mathematics)Product (mathematics)Conformal mapTopological algebraTopological quantum numberSymmetric polynomialSymmetric functionOperator product expansionSupersymmetryTopological orderGeneralizationRing (chemistry)Operator (biology)Order (exchange)Cohomology ringSuperconformal algebraSupersymmetric gauge theoryAlgebraic Geometry and Number TheoryAdvanced Combinatorial MathematicsAlgebraic structures and combinatorial models
The topological symmetric orbifold | Litcius