Complex Reflection Subgroups of Real Reflection Groups

In this paper, we prove that a simple system for a subsystem of the complex root system can always be chosen as a subset of the positive system + of . Furthermore, we show that a set of distinguished coset representatives can be found for every reflection subgroup of the complex reflection groups. T

Green functions of classical groups are determined by the data from Weyl groups and by certain combinatorial objects called symbols. Generalizing this, we Ž . define Green functions associated to complex reflection groups G e, 1, n and study their combinatorial properties. We construct Hall᎐Littlewo

Let G be a finite group of complex n = n unitary matrices generated by reflections acting on ‫ރ‬ n . Let R be the ring of invariant polynomials, and let be a multiplicative character of G. Let ⍀ be the R-module of -invariant differential forms. We define a multiplication in ⍀ and show that under thi

Any finite reflection group G admits a distinguished basis of G-invariants canonically attached to a certain system of invariant differential equations. We determine it explicitly for groups of types A, B, D, and I in a systematic way.