AbstractWe study the polynomials obtained by enumerating a finite Coxeter group by number of descents. The type A case gives rise to the familiar Eulerian polynomials, while the B and D cases provided two new q -analogues. Various recursion relations, generating functions and unimodality properties are derived, which generalize and unify earlier results of Dolgachev, Lunts, Stanley and Stembridge
AbstractNew enumerating functions for the Euler numbers are considered. Several of the relevant gene...
International audienceIt is known that Euler numbers, defined as the Taylor coefficients of the tang...
The concepts of Euler numbers and Euler polynomials are generalized and some basic properties are in...
AbstractWe study in this work properties of a combinatorial expansion of the classical Eulerian poly...
16 pages, published in The Electronic Journal of CombinatoricsInternational audienceThe $(q,r)$-Eule...
AbstractIn this paper, we focus on applications of q-Euler polynomials and obtain some new combinato...
We give a new construction of the q-extensions of Euler numbers and polynomials. We present new gene...
The Eulerian polynomial of a finite Coxeter system (W, S) of rank n records, for each k ¿ {1, . . . ...
International audienceThe classical Eulerian polynomials can be expanded in the basis $t^{k-1}(1+t)^...
AbstractWe show some results for the q-Bernoulli and q-Euler polynomials. The formulas in series of ...
New enumerating functions for the Euler numbers are considered. Several of the relevant generating f...
We define and study sub-Eulerian polynomials of type D, which count the elements of the group of eve...
We propose a q-analogue of the Kummer congruences for the study of the q-Euler numbers. A double seq...
We present q-analogues of exponential Euler polynomials and Euler-Frobenius polynomials from B-splin...
AbstractThe paper contains a combinatorial interpretation of the q-Eulerian numbers suggested by H. ...
AbstractNew enumerating functions for the Euler numbers are considered. Several of the relevant gene...
International audienceIt is known that Euler numbers, defined as the Taylor coefficients of the tang...
The concepts of Euler numbers and Euler polynomials are generalized and some basic properties are in...
AbstractWe study in this work properties of a combinatorial expansion of the classical Eulerian poly...
16 pages, published in The Electronic Journal of CombinatoricsInternational audienceThe $(q,r)$-Eule...
AbstractIn this paper, we focus on applications of q-Euler polynomials and obtain some new combinato...
We give a new construction of the q-extensions of Euler numbers and polynomials. We present new gene...
The Eulerian polynomial of a finite Coxeter system (W, S) of rank n records, for each k ¿ {1, . . . ...
International audienceThe classical Eulerian polynomials can be expanded in the basis $t^{k-1}(1+t)^...
AbstractWe show some results for the q-Bernoulli and q-Euler polynomials. The formulas in series of ...
New enumerating functions for the Euler numbers are considered. Several of the relevant generating f...
We define and study sub-Eulerian polynomials of type D, which count the elements of the group of eve...
We propose a q-analogue of the Kummer congruences for the study of the q-Euler numbers. A double seq...
We present q-analogues of exponential Euler polynomials and Euler-Frobenius polynomials from B-splin...
AbstractThe paper contains a combinatorial interpretation of the q-Eulerian numbers suggested by H. ...
AbstractNew enumerating functions for the Euler numbers are considered. Several of the relevant gene...
International audienceIt is known that Euler numbers, defined as the Taylor coefficients of the tang...
The concepts of Euler numbers and Euler polynomials are generalized and some basic properties are in...