AbstractThe category of combinatorial species was introduced by Joyal, and has been studied extensively by him and others. This category is equipped with a derivative operation (endofunctor). This allows one to differentiate species in a manner similar to differentiating power series. We solve, completely, the family of differential equations Dky = Xn for species. For this, we use results on the conjugacy classes of sharply k-transitive groups. We provide, also, a new proof of a sharpened version of Zassenhaus' theorem on sharply 2-transitive groups of type I
AbstractAs a direct consequence of the Kan Extension Theorem, the derivative functor, D, on (combina...
With each second-order differential equation Z in the evolution space J1 (Mn+1) we associate, using ...
In this paper, we present a bijective proof of the �-Mehler formula. The proof is in the same style ...
AbstractThe category of combinatorial species was introduced by Joyal, and has been studied extensiv...
AbstractWe give combinatorial proofs of the primary results developed by Stanley for deriving enumer...
AbstractWe describe the close relationship between permutation groups and combinatorial species (int...
We give combinatorial proofs of the primary results developed by Stanley for deriving enumerative pr...
AbstractLet f = f(x) = x + a2x2 + … ∈ K[[x]] be a “normalized” power series over a (commutative) fie...
Quivers (directed graphs) and species (a generalization of quivers) as well as their representations...
Butcher series appear when Runge–Kutta methods for ordinary differential equations are expanded in p...
International audienceSpringer numbers are analogs of Euler numbers for the group of signed permutat...
We describe weak (D,O)-species of bounded representation type in terms of Dynkin diagrams and diagra...
The problem of extending (sharply) k-transitive permutation sets into (sharply) (k+1)-transitive per...
AbstractGiven a sequence A=(A1,…,Ar) of binary d-ics, we construct a set of combinants C={Cq:0≤q≤r,q...
AbstractWe analyse the solution set of first-order initial value differential problems of the form d...
AbstractAs a direct consequence of the Kan Extension Theorem, the derivative functor, D, on (combina...
With each second-order differential equation Z in the evolution space J1 (Mn+1) we associate, using ...
In this paper, we present a bijective proof of the �-Mehler formula. The proof is in the same style ...
AbstractThe category of combinatorial species was introduced by Joyal, and has been studied extensiv...
AbstractWe give combinatorial proofs of the primary results developed by Stanley for deriving enumer...
AbstractWe describe the close relationship between permutation groups and combinatorial species (int...
We give combinatorial proofs of the primary results developed by Stanley for deriving enumerative pr...
AbstractLet f = f(x) = x + a2x2 + … ∈ K[[x]] be a “normalized” power series over a (commutative) fie...
Quivers (directed graphs) and species (a generalization of quivers) as well as their representations...
Butcher series appear when Runge–Kutta methods for ordinary differential equations are expanded in p...
International audienceSpringer numbers are analogs of Euler numbers for the group of signed permutat...
We describe weak (D,O)-species of bounded representation type in terms of Dynkin diagrams and diagra...
The problem of extending (sharply) k-transitive permutation sets into (sharply) (k+1)-transitive per...
AbstractGiven a sequence A=(A1,…,Ar) of binary d-ics, we construct a set of combinants C={Cq:0≤q≤r,q...
AbstractWe analyse the solution set of first-order initial value differential problems of the form d...
AbstractAs a direct consequence of the Kan Extension Theorem, the derivative functor, D, on (combina...
With each second-order differential equation Z in the evolution space J1 (Mn+1) we associate, using ...
In this paper, we present a bijective proof of the �-Mehler formula. The proof is in the same style ...