Litcius/Paper detail

Back stable Schubert calculus

Thomas Lam, Seung Jin Lee, Mark Shimozono

2021Compositio Mathematica52 citationsDOIOpen Access PDF

Abstract

We study the back stable Schubert calculus of the infinite flag variety. Our main results are: – a formula for back stable (double) Schubert classes expressing them in terms of a symmetric function part and a finite part; – a novel definition of double and triple Stanley symmetric functions; – a proof of the positivity of double Edelman–Greene coefficients generalizing the results of Edelman–Greene and Lascoux–Schützenberger; – the definition of a new class of bumpless pipedreams, giving new formulae for double Schubert polynomials, back stable double Schubert polynomials, and a new form of the Edelman–Greene insertion algorithm; – the construction of the Peterson subalgebra of the infinite nilHecke algebra, extending work of Peterson in the affine case; – equivariant Pieri rules for the homology of the infinite Grassmannian; – homology divided difference operators that create the equivariant homology Schubert classes of the infinite Grassmannian.

Topics & Concepts

Schubert calculusMathematicsSchubert polynomialPure mathematicsEquivariant mapSchubert varietyHomology (biology)Affine transformationFlag (linear algebra)SubalgebraAlgebra over a fieldGeneralized flag varietyCombinatoricsClass (philosophy)Direct proofCombinatorial proofGenerating functionDiscrete mathematicsFunction (biology)Advanced Combinatorial MathematicsPolynomial and algebraic computationAlgebraic structures and combinatorial models