Litcius/Paper detail

Left Demazure–Lusztig Operators on Equivariant (Quantum) Cohomology and K-Theory

Leonardo C. Mihalcea, Hiroshi Naruse, Changjian Su

2021International Mathematics Research Notices20 citationsDOI

Abstract

Abstract We study the Demazure–Lusztig operators induced by the left multiplication on partial flag manifolds $G/P$. We prove that they generate the Chern–Schwartz–MacPherson classes of Schubert cells (in equivariant cohomology), respectively their motivic Chern classes (in equivariant K-theory), in any partial flag manifold. Along the way, we advertise many properties of the left and right divided difference operators in cohomology and K-theory and their actions on Schubert classes. We apply this to construct left divided difference operators in equivariant quantum cohomology, and equivariant quantum K-theory, generating Schubert classes and satisfying a Leibniz rule compatible with the quantum product.

Topics & Concepts

MathematicsEquivariant mapGeneralized flag varietyFlag (linear algebra)Equivariant cohomologyPure mathematicsSchubert calculusQuantum cohomologyCohomologyAlgebra over a fieldLie groupGrassmannianAlgebraic structures and combinatorial modelsAdvanced Algebra and GeometryAdvanced Combinatorial Mathematics