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Higher rank K-theoretic Donaldson-Thomas Theory of points

Nadir Fasola, Sergej Monavari, Andrea T. Ricolfi

2021Forum of Mathematics Sigma21 citationsDOIOpen Access PDF

Abstract

Abstract We exploit the critical structure on the Quot scheme $\text {Quot}_{{{\mathbb {A}}}^3}({\mathscr {O}}^{\oplus r}\!,n)$ , in particular the associated symmetric obstruction theory, in order to study rank r K-theoretic Donaldson-Thomas (DT) invariants of the local Calabi-Yau $3$ -fold ${{\mathbb {A}}}^3$ . We compute the associated partition function as a plethystic exponential, proving a conjecture proposed in string theory by Awata-Kanno and Benini-Bonelli-Poggi-Tanzini. A crucial step in the proof is the fact, nontrival if $r>1$ , that the invariants do not depend on the equivariant parameters of the framing torus $({{\mathbb {C}}}^\ast )^r$ . Reducing from K-theoretic to cohomological invariants, we compute the corresponding DT invariants, proving a conjecture of Szabo. Reducing further to enumerative DT invariants, we solve the higher rank DT theory of a pair $(X,F)$ , where F is an equivariant exceptional locally free sheaf on a projective toric $3$ -fold X . As a further refinement of the K-theoretic DT invariants, we formulate a mathematical definition of the chiral elliptic genus studied in physics. This allows us to define elliptic DT invariants of ${{\mathbb {A}}}^3$ in arbitrary rank, which we use to tackle a conjecture of Benini-Bonelli-Poggi-Tanzini.

Topics & Concepts

MathematicsEquivariant mapConjectureSheafRank (graph theory)Pure mathematicsCombinatoricsDiscrete mathematicsPartition (number theory)Partition function (quantum field theory)String theorySymmetric functionInvariant (physics)Order (exchange)Algebraic geometryFunction (biology)Invariant theoryAlgebra over a fieldElliptic curveFixed pointAlgebraic Geometry and Number TheoryGeometry and complex manifoldsAlgebraic structures and combinatorial models
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