Parabolic Double Cosets in Coxeter Groups

Parabolic subgroups $W_I$ of Coxeter systems $(W,S)$, as well as their ordinary and double quotients $W / W_I$ and $W_I \backslash W / W_J$, appear in many contexts in combinatorics and Lie theory, including the geometry and topology of generalized flag varieties and the symmetry groups of regular polytopes. The set of ordinary cosets $w W_I$, for $I \subseteq S$, forms the Coxeter complex of $W$, and is well-studied. In this article we look at a less studied object: the set of all double cosets $W_I w W_J$ for $I, J \subseteq S$. Double coset are not uniquely presented by triples $(I,w,J)$. We describe what we call the lex-minimal presentation, and prove that there exists a unique such object for each double coset. Lex-minimal presentations are then used to enumerate double cosets via a finite automaton depending on the Coxeter graph for $(W,S)$. As an example, we present a formula for the number of parabolic double cosets with a fixed minimal element when $W$ is the symmetric group $S_n$ (in this case, parabolic subgroups are also known as Young subgroups). Our formula is almost always linear time computable in $n$, and we show how it can be generalized to any Coxeter group with little additional work. We spell out formulas for all finite and affine Weyl groups in the case that $w$ is the identity element.

[1]  R. Stanley What Is Enumerative Combinatorics , 1986 .

[2]  Masato Kobayashi,et al.  Two-sided structure of double cosets in Coxeter groups , 2011 .

[3]  John R. Stembridge,et al.  Tight Quotients and Double Quotients in the Bruhat Order , 2005, Electron. J. Comb..

[4]  Sabrina Hirsch,et al.  Reflection Groups And Coxeter Groups , 2016 .

[5]  T. Kyle Petersen,et al.  Two-Sided Eulerian Numbers via Balls in Boxes , 2012, 1209.6273.

[6]  T. Kyle Petersen A Two-Sided Analogue of the Coxeter Complex , 2018, Electron. J. Comb..

[7]  R. Carter REFLECTION GROUPS AND COXETER GROUPS (Cambridge Studies in Advanced Mathematics 29) , 1991 .

[8]  G. B. Mathews,et al.  Combinatory Analysis. Vol. II , 1915, The Mathematical Gazette.

[9]  I. Herstein,et al.  Topics in algebra , 1964 .

[10]  William Slofstra,et al.  Staircase diagrams and enumeration of smooth Schubert varieties , 2015, J. Comb. Theory, Ser. A.

[11]  Charles W. Curtis,et al.  On Lusztig's isomorphism theorem for Hecke algebras , 1985 .

[12]  N. Bourbaki,et al.  Lie Groups and Lie Algebras: Chapters 1-3 , 1989 .

[13]  N. J. A. Sloane,et al.  The On-Line Encyclopedia of Integer Sequences , 2003, Electron. J. Comb..

[14]  A. Björner,et al.  Combinatorics of Coxeter Groups , 2005 .

[15]  R. Stanley Enumerative Combinatorics: Volume 1 , 2011 .

[16]  Louis Solomon,et al.  A Mackey formula in the group ring of a Coxeter group , 1976 .

[17]  Leonard Carlitz,et al.  Congruences for Eulerian numbers , 1953 .

[18]  Adriano M. Garsia,et al.  Group actions on Stanley-Reisner rings and invariants of permutation groups☆ , 1984 .

[19]  Brian Parshall,et al.  Algebraic Groups and Their Generalizations: Classical Methods , 1994 .

[20]  P. Diaconis,et al.  Rectangular Arrays with Fixed Margins , 1995 .

[21]  Gérard Duchamp,et al.  Noncommutative Symmetric Functions Vi: Free Quasi-Symmetric Functions and Related Algebras , 2002, Int. J. Algebra Comput..

[22]  J. Humphreys Reflection groups and coxeter groups , 1990 .

[23]  Richard P. Stanley,et al.  Weyl Groups, the Hard Lefschetz Theorem, and the Sperner Property , 1980, SIAM J. Algebraic Discret. Methods.