After recalling the most important properties and applications of the Bell polynomials, we introduce an extension of this special class of functions. More precisely, we consider the case of multicomposite functions, and we show connections with the ordinary Bell polynomials
We use the Z-transform to solve a type of recurrence relation satisfied by the number of representat...
In this work we present an extension of Bell exponential polynomials to fractional and negative indi...
AbstractThe well-known formula of Faà di Bruno’s for higher derivatives of a composite function has ...
After recalling the most important properties and applications of the Bell polynomials, we introduce...
AbstractAfter recalling the most important properties and applications of the Bell polynomials, we i...
AbstractWe develop some extensions of the classical Bell polynomials, previously obtained, by introd...
We develop some extensions of the classical Bell polynomials, previously obtained, by introducing a ...
We develop some extensions of the classical Bell polynomials, previously obtained, by introducing a ...
AbstractThis paper concerns the study of the Bell polynomials and the binomial type sequences. We ma...
AbstractWe develop some extensions of the classical Bell polynomials, previously obtained, by introd...
We develop an extension of the classical Bell polynomials introducing the Laguerre-type version of t...
We recover a recurrence relation for representing in an easy form the coefficients $ A_{n,k} $ of th...
Partial multivariate Bell polynomials have been defined by E.T. Bell in 1934. These polynomials have...
International audienceMultivariate partial Bell polynomials have been dened by E.T. Bell in 1934. Th...
International audienceMultivariate partial Bell polynomials have been dened by E.T. Bell in 1934. Th...
We use the Z-transform to solve a type of recurrence relation satisfied by the number of representat...
In this work we present an extension of Bell exponential polynomials to fractional and negative indi...
AbstractThe well-known formula of Faà di Bruno’s for higher derivatives of a composite function has ...
After recalling the most important properties and applications of the Bell polynomials, we introduce...
AbstractAfter recalling the most important properties and applications of the Bell polynomials, we i...
AbstractWe develop some extensions of the classical Bell polynomials, previously obtained, by introd...
We develop some extensions of the classical Bell polynomials, previously obtained, by introducing a ...
We develop some extensions of the classical Bell polynomials, previously obtained, by introducing a ...
AbstractThis paper concerns the study of the Bell polynomials and the binomial type sequences. We ma...
AbstractWe develop some extensions of the classical Bell polynomials, previously obtained, by introd...
We develop an extension of the classical Bell polynomials introducing the Laguerre-type version of t...
We recover a recurrence relation for representing in an easy form the coefficients $ A_{n,k} $ of th...
Partial multivariate Bell polynomials have been defined by E.T. Bell in 1934. These polynomials have...
International audienceMultivariate partial Bell polynomials have been dened by E.T. Bell in 1934. Th...
International audienceMultivariate partial Bell polynomials have been dened by E.T. Bell in 1934. Th...
We use the Z-transform to solve a type of recurrence relation satisfied by the number of representat...
In this work we present an extension of Bell exponential polynomials to fractional and negative indi...
AbstractThe well-known formula of Faà di Bruno’s for higher derivatives of a composite function has ...