BPS states, knots and quivers
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We argue how to identify supersymmetric quiver quantum mechanics description of BPS states, which arise in string theory in brane systems representing knots. This leads to a surprising relation between knots and quivers: to a given knot we associate a quiver, so that various types of knot invariants are expressed in terms of characteristics of a moduli space of representations of the corresponding quiver. This statement can be regarded as a novel type of categorification of knot invariants, and among its various consequences we find that Labastida-Mari\~no-Ooguri-Vafa (LMOV) invariants of a knot can be expressed in terms of motivic Donaldson-Thomas invariants of the corresponding quiver; this proves integrality of LMOV invariants, conjectured originally based on string theory and M-theory arguments.
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Cited by 1 Pith paper
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Gang-Kim-Yoon integrality conjectures on adjoint Reidemeister torsions for torus knots
Proves the Gang-Kim-Yoon integrality conjecture for adjoint Reidemeister torsions of all torus knots by defining Verlinde numbers via the modular S-matrix and establishing their recursion relations.
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