Explicit formulas for the Dumont-Foata polynomial

We consider the Kazhdan Lusztig R-polynomials, R u, v (q) indexed by permutations ``u, v'' having particular forms. More precisely, we show that R e, 34 } } } n12 (q) (where ``e'' denotes the identity permutation) equals, aside from a simple change of variable, a q-analogue of the Fibonacci number,

An explicit formula for establishing the relationship between the original coeficients of a single-variable polynomial and the coeficients of the transformed polynomial upon application of the general bilinear transformation is derived. The derivation is based on an alternative approach which is sim

Knop and Sahi simultaneously introduced a family of non-homogeneous, non-symmetric polynomials, G : (x; q, t). The top homogeneous components of these polynomials are the non-symmetric Macdonald polynomials, E : (x; q, t). An appropriate Hecke algebra symmetrization of E : yields the Macdonald polyn

We present formulas of Rodrigues type giving the Macdonald polynomials for arbitrary partitions \* through the repeated application of creation operators B k , k=1, ..., l (\*) on the constant 1. Three expressions for the creation operators are derived one from the other. When the last of these expr