Here we present a characterization of Sheffer-type polynomial sequences based on the isomorphism between the Riordan group and Sheffer group and the sequence characterization of Riordan arrays. We also give several alternative forms of the characterization of the Riordan group, Sheffer group and their subgroups. Formulas for the computation of the generating functions of Riordan arrays and Sheffer-type polynomial sequences from the characteristics are shown. Furthermore, the applications of the characteristics to lattice walks and recursive construction of Sheffer-type polynomial sequences are also given
We study integer sequences using methods from the theory of continued fractions, or- thogonal polyno...
The main objects of our study are the algebraic structure of Riordan arrays, the properties of subg...
AbstractIn this paper, using the production matrix of an exponential Riordan array [g(t),f(t)], we g...
Here we present a characterization of Sheffer-type polynomial sequences based on the isomorphism bet...
Dedicated to Roger B. Eggleton on the occasion of his 70th birthday Here we present a characterizati...
We define the Sheffer group of all Sheffer-type polynomials and prove the isomorphism between the Sh...
AbstractWe define the Sheffer group of all Sheffer-type polynomials and prove the isomorphism betwee...
A relationship between a pair of Laurent series and Riordan arrays is formulated. In addition, a typ...
AbstractA relationship between a pair of Laurent series and Riordan arrays is formulated. In additio...
In the realm of the Riordan group, we consider the characterization of Riordan arrays by means of th...
AbstractIn the realm of the Riordan group, we consider the characterization of Riordan arrays by mea...
Here presented are the definitions of (c)-Riordan arrays and (c)-Bell polynomials which are extensio...
AbstractIn this short note, we focus on self-inverse Sheffer sequences and involutions in the Riorda...
Sheffer’s work is about to turn 100 years after its publication. In reporting this important event, ...
We study integer sequences using methods from the theory of continued fractions, or- thogonal polyno...
The main objects of our study are the algebraic structure of Riordan arrays, the properties of subg...
AbstractIn this paper, using the production matrix of an exponential Riordan array [g(t),f(t)], we g...
Here we present a characterization of Sheffer-type polynomial sequences based on the isomorphism bet...
Dedicated to Roger B. Eggleton on the occasion of his 70th birthday Here we present a characterizati...
We define the Sheffer group of all Sheffer-type polynomials and prove the isomorphism between the Sh...
AbstractWe define the Sheffer group of all Sheffer-type polynomials and prove the isomorphism betwee...
A relationship between a pair of Laurent series and Riordan arrays is formulated. In addition, a typ...
AbstractA relationship between a pair of Laurent series and Riordan arrays is formulated. In additio...
In the realm of the Riordan group, we consider the characterization of Riordan arrays by means of th...
AbstractIn the realm of the Riordan group, we consider the characterization of Riordan arrays by mea...
Here presented are the definitions of (c)-Riordan arrays and (c)-Bell polynomials which are extensio...
AbstractIn this short note, we focus on self-inverse Sheffer sequences and involutions in the Riorda...
Sheffer’s work is about to turn 100 years after its publication. In reporting this important event, ...
We study integer sequences using methods from the theory of continued fractions, or- thogonal polyno...
The main objects of our study are the algebraic structure of Riordan arrays, the properties of subg...
AbstractIn this paper, using the production matrix of an exponential Riordan array [g(t),f(t)], we g...