3d mirror symmetry of the cotangent bundle of the full flag variety

Aganagic and Okounkov proved that the elliptic stable envelope provides the pole cancellation matrix for the enumerative invariants of quiver varieties known as vertex functions. This transforms a basis of a system of q -difference equations holomorphic in variables z with poles in variables a to a...

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Bibliographic Details
Published in:Letters in mathematical physics 2022-10, Vol.112 (5), Article 100
Main Author: Dinkins, Hunter
Format: Article
Language:English
Subjects:
Complex Systems
Difference equations
Flags
Geometry
Group Theory and Generalizations
Mathematical analysis
Mathematical and Computational Physics
Physics
Physics and Astronomy
Poles
Theoretical
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Summary:Aganagic and Okounkov proved that the elliptic stable envelope provides the pole cancellation matrix for the enumerative invariants of quiver varieties known as vertex functions. This transforms a basis of a system of q -difference equations holomorphic in variables z with poles in variables a to a basis of solutions holomorphic in a with poles in z . The resulting functions are expected to be the vertex functions of the 3d mirror dual variety. In this paper, we prove that the functions obtained by applying the elliptic stable envelope to the vertex functions of the cotangent bundle of the full flag variety are precisely the vertex functions for the same variety under an exchange of the parameters Å ↔ z . As a corollary of this, we deduce the expected 3d mirror relationship for the elliptic stable envelope.
ISSN:0377-9017
1573-0530
DOI:10.1007/s11005-022-01593-4