AbstractIn [R. Clarke, G.N. Han, J. Zeng, A combinatorial interpretation of the Seidel generation of q-derangement numbers, Ann. Comb. 1 (1997) 313–327] Clarke, Han and Zeng introduced a generalized Euler’s difference table. In this paper, we add a third variable and give a combinatorial interpretation of this generalization
We propose a q-analogue of the Kummer congruences for the study of the q-Euler numbers. A double seq...
AbstractWe find an enumeration formula for a (t,q)-Euler number which is a generalization of the q-E...
The widely studied q-polynomial fλ(q), which specializes when q = 1 to fλ, the number of standard Yo...
Abstract. In [8] Dumont and Randrianarivony have given several combinatorial interpretations for the...
AbstractWe make use of the notion of ‘doubled fixed point’ in the graph of an exceeding mapping, to ...
Au cours des deux dernières décennies, des travaux actifs ont été menés pour étendre des résultats c...
New enumerating functions for the Euler numbers are considered. Several of the relevant generating f...
AbstractNew enumerating functions for the Euler numbers are considered. Several of the relevant gene...
AbstractA new q-analog of Genocchi numbers is introduced through a q-analog of Seidel’s triangle ass...
AbstractThe paper contains a combinatorial interpretation of the q-Eulerian numbers suggested by H. ...
International audienceA classical result of Euler states that the tangent numbers are an alternating...
AbstractA classical result of Euler states that the tangent numbers are an alternating sum of Euleri...
In the last two decades, much effort has been made to extend various enumerative results on symmetri...
In this paper, we derive several combinatorial identities involving the q-derangement numbers (for t...
In this paper, we study the numbers D n,k which ...
We propose a q-analogue of the Kummer congruences for the study of the q-Euler numbers. A double seq...
AbstractWe find an enumeration formula for a (t,q)-Euler number which is a generalization of the q-E...
The widely studied q-polynomial fλ(q), which specializes when q = 1 to fλ, the number of standard Yo...
Abstract. In [8] Dumont and Randrianarivony have given several combinatorial interpretations for the...
AbstractWe make use of the notion of ‘doubled fixed point’ in the graph of an exceeding mapping, to ...
Au cours des deux dernières décennies, des travaux actifs ont été menés pour étendre des résultats c...
New enumerating functions for the Euler numbers are considered. Several of the relevant generating f...
AbstractNew enumerating functions for the Euler numbers are considered. Several of the relevant gene...
AbstractA new q-analog of Genocchi numbers is introduced through a q-analog of Seidel’s triangle ass...
AbstractThe paper contains a combinatorial interpretation of the q-Eulerian numbers suggested by H. ...
International audienceA classical result of Euler states that the tangent numbers are an alternating...
AbstractA classical result of Euler states that the tangent numbers are an alternating sum of Euleri...
In the last two decades, much effort has been made to extend various enumerative results on symmetri...
In this paper, we derive several combinatorial identities involving the q-derangement numbers (for t...
In this paper, we study the numbers D n,k which ...
We propose a q-analogue of the Kummer congruences for the study of the q-Euler numbers. A double seq...
AbstractWe find an enumeration formula for a (t,q)-Euler number which is a generalization of the q-E...
The widely studied q-polynomial fλ(q), which specializes when q = 1 to fλ, the number of standard Yo...
DOI
Add to ORKG