论文信息 - MATHEMATICAL ENGINEERING TECHNICAL REPORTS The characteristic quasi-polynomials of the arrangements of root systems

MATHEMATICAL ENGINEERING TECHNICAL REPORTS The characteristic quasi-polynomials of the arrangements of root systems

For an irreducible root system R, consider a coefficient matrix S of the positive roots with respect to the associated simple roots. Then S defines an arrangement of “hyperplanes” modulo a positive integer q. The cardinality of the complement of this arrangement is a quasi-polynomial of q, which we call the characteristic quasi-polynomial of R. This paper gives the complete list of the characteristic quasi-polynomials of all irreducible root systems, and shows that the characteristic quasi-polynomial of an irreducible root system R is positive at q ∈ Z>0 if and only if q is greater than or equal to the Coxeter number of R.

Akimichi Takemura | Hidehiko Kamiya | Hiroaki Terao

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

[2] Charalambos A. Charalambides,et al. Enumerative combinatorics , 2018, SIGA.

[3] Akimichi Takemura,et al. Arrangements and Ranking Patterns , 2006 .

[4] N. Bourbaki. Lie groups and Lie algebras , 1998 .

[5] P. Orlik,et al. Arrangements Of Hyperplanes , 1992 .

[6] Mark D. Haiman. ON THE QUOTIENT RING BY DIAGONAL INVARIANTS , 1994 .

[7] M. Aigner. Combinatorial Order Theory , 1979 .

[8] Akimichi Takemura,et al. Periodicity of hyperplane arrangements with integral coefficients modulo positive integers , 2007, math/0703904.

[9] Ruedi Suter. The number of lattice points in alcoves and the exponents of the finite Weyl groups , 1998, Math. Comput..

[10] Andreas Blass,et al. Characteristic and Ehrhart Polynomials , 1998 .

[11] Christos A. Athanasiadis. Characteristic Polynomials of Subspace Arrangements and Finite Fields , 1996 .

[12] C. Coombs. A theory of data. , 1965, Psychology Review.