AbstractGreen functions of classical groups are determined by the data from Weyl groups and by certain combinatorial objects called symbols. Generalizing this, we define Green functions associated to complex reflection groups G(e,1,n) and study their combinatorial properties. We construct Hall–Littlewood functions and Schur functions in our scheme and show that such Green functions are obtained as a transition matrix between those two symmetric functions, as in the case of GLn
Specializations of Schur functions are exploited to define and evaluate the Schur functions s?[?X] a...
We consider Green polynomials at roots of unity. We obtain a recursive formula for Green polynomials...
AbstractIn his classic book on symmetric functions, Macdonald describes a remarkable result by Green...
AbstractGreen functions of classical groups are determined by the data from Weyl groups and by certa...
AbstractGreen functions associated to complex reflection groups G(e,1,n) were discussed in the autho...
AbstractLet W be the complex reflection group Sn⋉(Z/eZ)n. In the author's previous paper [J. Algebra...
We present a formula for the values of the sign representations of a complex reflection group G(r, p...
In this paper we define and study generalized Green functions for possibly disconnected groups
We study the complex reflection groups G(r, p, n). By considering these groups as subgroups of the w...
For every r, n, p|r there is a complex reflection group, denoted G(r, p, n), consisting of all monom...
Weyl groups are particular cases of complex reflection groups, i.e. finite subgroups of GLr(C) gener...
AbstractThis is a survey paper concerning multi-variable special functions associated with finite re...
Abstract. In this paper, we compare the Green functions of Sp(2n, q) and SO(2n + 1, q) with those of...
SubmittedMotivated by Dunkl operators theory, we consider a generating series involving a modified B...
Neaime G. Geodesic normal forms and Hecke algebras for the complex reflection groups G(de, e, n). JO...
Specializations of Schur functions are exploited to define and evaluate the Schur functions s?[?X] a...
We consider Green polynomials at roots of unity. We obtain a recursive formula for Green polynomials...
AbstractIn his classic book on symmetric functions, Macdonald describes a remarkable result by Green...
AbstractGreen functions of classical groups are determined by the data from Weyl groups and by certa...
AbstractGreen functions associated to complex reflection groups G(e,1,n) were discussed in the autho...
AbstractLet W be the complex reflection group Sn⋉(Z/eZ)n. In the author's previous paper [J. Algebra...
We present a formula for the values of the sign representations of a complex reflection group G(r, p...
In this paper we define and study generalized Green functions for possibly disconnected groups
We study the complex reflection groups G(r, p, n). By considering these groups as subgroups of the w...
For every r, n, p|r there is a complex reflection group, denoted G(r, p, n), consisting of all monom...
Weyl groups are particular cases of complex reflection groups, i.e. finite subgroups of GLr(C) gener...
AbstractThis is a survey paper concerning multi-variable special functions associated with finite re...
Abstract. In this paper, we compare the Green functions of Sp(2n, q) and SO(2n + 1, q) with those of...
SubmittedMotivated by Dunkl operators theory, we consider a generating series involving a modified B...
Neaime G. Geodesic normal forms and Hecke algebras for the complex reflection groups G(de, e, n). JO...
Specializations of Schur functions are exploited to define and evaluate the Schur functions s?[?X] a...
We consider Green polynomials at roots of unity. We obtain a recursive formula for Green polynomials...
AbstractIn his classic book on symmetric functions, Macdonald describes a remarkable result by Green...
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