k-Schur Functions and Affine Schubert Calculus
Buch in deiner Nähe kaufen
Beschreibung
This book gives an introduction to the very active field of combinatorics of affine Schubert calculus, explains the current state of the art, and states the current open problems. Affine Schubert calculus lies at the crossroads of combinatorics, geometry, and representation theory. Its modern development is motivated by two seemingly unrelated directions. One is the introduction of k-Schur functions in the study of Macdonald polynomial positivity, a mostly combinatorial branch of symmetric function theory. The other direction is the study of the Schubert bases of the (co)homology of the affine Grassmannian, an algebro-topological formulation of a problem in enumerative geometry.
This is the first introductory text on this subject. It contains many examples in Sage, a free open source general purpose mathematical software system, to entice the reader to investigate the open problems. This book is written for advanced undergraduate and graduate students, as well as researchers,who want to become familiar with this fascinating new field.
This book gives an introduction to the very active field of combinatorics of affine Schubert calculus, explains the current state of the art, and states the current open problems. Affine Schubert calculus lies at the crossroads of combinatorics, geometry, and representation theory. Its modern development is motivated by two seemingly unrelated directions. One is the introduction of k-Schur functions in the study of Macdonald polynomial positivity, a mostly combinatorial branch of symmetric function theory. The other direction is the study of the Schubert bases of the (co)homology of the affine Grassmannian, an algebro-topological formulation of a problem in enumerative geometry.
This is the first introductory text on this subject. It contains many examples in Sage, a free open source general purpose mathematical software system, to entice the reader to investigate the open problems. This book is written for advanced undergraduate and graduate students, as well as researchers,who want to become familiar with this fascinating new field.
Summarizes the current state in an active area of research and outlines the open research questions which motivate the subject Demonstrates calculations using the software package Sage so that readers can more easily experiment and develop conjectures themselves Contains examples and exercises, among other introductory material, to assist advanced undergraduates and graduate students in getting started in the area Includes supplementary material: sn.pub/extras
Autor*in
Thomas Lam
Themen in »k-Schur Functions and Affine Schubert Calculus«
Macdonald polynomial positivity Schubert bases Stanley symmetric functions affine Schubert calculus enumerative geometry representation theory combinatorics
Stimmen zu »k-Schur Functions and Affine Schubert Calculus«
“The monograph under review provides a nice introduction to the theory of k-Schur functions and affine Schubert calculus over the last ten years. … this is an invaluable research monograph. I highly recommend it to anyone who wants to enter this fascinating new field.” (Arthur L. B. Yang, Mathematical Reviews, February, 2017)
()