A Borel–Weil theorem for the quantum Grassmannians
Alessandro Carotenuto, Colin Mrozinski, Réamonn Ó Buachalla
Abstract
We establish a noncommutative generalisation of the Borel–Weil theorem for the celebrated Heckenberger–Kolb calculi of the quantum Grassmannians. The result is formulated in the framework of quantum principal bundles and noncommutative complex structures, and generalises previous work of a number of authors on quantum projective space. As a direct consequence we get a novel noncommutative differential geometric presentation of the twisted Grassmannian coordinate ring studied in noncommutative projective geometry. A number of applications to the noncommutative Kähler geometry of the quantum Grassmannians are also given.
Topics & Concepts
Noncommutative geometryMathematicsHolomorphic functionPure mathematicsGrassmannianQuantum differential calculusNoncommutative algebraic geometryQuantumNoncommutative quantum field theoryProjective spaceAlgebra over a fieldCohomology ringCohomologyProjective testEquivariant cohomologyQuantum mechanicsPhysicsAlgebraic structures and combinatorial modelsAdvanced Topics in AlgebraAdvanced Algebra and Geometry