AbstractThrough the notion of enriched species, we develop a bijective calculus set-theoretic counterpart of the theory of binomial enumeration
AbstractWe present some standard results in the theory of polynomials of binomial type from a differ...
A sequence of binomial type is a basis for [x] satisfying a binomial-like identity, e.g. powers, ris...
Some important properties of the chromatic polynomial also hold for any polynomial set map ...
Through the notion of enriched species, we develop a bijective calculus set-theoretic counterpart of...
AbstractWe introduce the notion of enriched species, which we believe to be the right tool for a set...
AbstractThrough the notion of enriched species, we develop a bijective calculus set-theoretic counte...
We introduce the notion of enriched species, which we believe to be the right tool for a set-theoret...
AbstractAn algebraic setting for the Roman-Rota umbral calculus is introduced. It is shown how many ...
AbstractRota's Umbral Calculus uses sequences of Sheffer polynomials to count certain combinatorial ...
AbstractWe introduce two new binary operations on combinatorial species; the arithmetic product and ...
Sequences of binomial type are thoroughly structured polynomial sequences. We view them as being par...
AbstractThis paper presents an extension of the umbral calculus to infinitely many variables, in whi...
AbstractA sequence of binomial type is a basis for R[x] satisfying a binomial-like identity, e.g. po...
Abstract. Let n be a nonnegative integer. We call widened permuta- tion a bijection between two (n+...
AbstractLet ξ be a complex variable. We associate a polynomial in ξ, denoted (MN)ξ, to any two molec...
AbstractWe present some standard results in the theory of polynomials of binomial type from a differ...
A sequence of binomial type is a basis for [x] satisfying a binomial-like identity, e.g. powers, ris...
Some important properties of the chromatic polynomial also hold for any polynomial set map ...
Through the notion of enriched species, we develop a bijective calculus set-theoretic counterpart of...
AbstractWe introduce the notion of enriched species, which we believe to be the right tool for a set...
AbstractThrough the notion of enriched species, we develop a bijective calculus set-theoretic counte...
We introduce the notion of enriched species, which we believe to be the right tool for a set-theoret...
AbstractAn algebraic setting for the Roman-Rota umbral calculus is introduced. It is shown how many ...
AbstractRota's Umbral Calculus uses sequences of Sheffer polynomials to count certain combinatorial ...
AbstractWe introduce two new binary operations on combinatorial species; the arithmetic product and ...
Sequences of binomial type are thoroughly structured polynomial sequences. We view them as being par...
AbstractThis paper presents an extension of the umbral calculus to infinitely many variables, in whi...
AbstractA sequence of binomial type is a basis for R[x] satisfying a binomial-like identity, e.g. po...
Abstract. Let n be a nonnegative integer. We call widened permuta- tion a bijection between two (n+...
AbstractLet ξ be a complex variable. We associate a polynomial in ξ, denoted (MN)ξ, to any two molec...
AbstractWe present some standard results in the theory of polynomials of binomial type from a differ...
A sequence of binomial type is a basis for [x] satisfying a binomial-like identity, e.g. powers, ris...
Some important properties of the chromatic polynomial also hold for any polynomial set map ...