AbstractIn this work, we propose two new methods for the determination of new identities for Bell's polynomials. The first method is based on the Lagrange inversion formula, and the second is based on the binomial sequences. These methods allow the easy recovery of known identities and deduction of some new identities of these polynomials
AbstractThe current article focus on the ordinary Bernoulli, Euler and Genocchi numbers and polynomi...
In this paper, we study differential equations arising from the generating functions of the generali...
We recover a recurrence relation for representing in an easy form the coefficients $ A_{n,k} $ of th...
AbstractThis paper concerns the study of the Bell polynomials and the binomial type sequences. We ma...
AbstractThe exponential partial Bell polynomials are polynomials in an infinite number of variables ...
AbstractUsing the exponential generating function and the Bell polynomials, we obtain several new id...
In the paper, the authors study new degenerating approach to the Bell polynomials which are called f...
[[abstract]]The purpose of this paper is to establish several identities involving the partial Bell ...
AbstractThe well-known Faà di Bruno formula for higher derivatives of a composite function plays an ...
Feng Qi, Da-Wei Niu, and Dongkyu Lim, Notes on explicit and inversion formulas for the Chebyshev pol...
The authors establish a pair of closed-form expressions for special values of the Bell polynomials o...
Abstract The aim of this paper is to study the complete and incomplete degenerate Bell polynomials, ...
The following outlines my Ph.D thesis on Lagrange Inversion, Rogers-Ramanujan identities, and orthog...
AbstractUsing the finite difference calculus and differentiation, we obtain several new identities f...
AbstractWe define the generalized potential polynomials associated to an independent variable, and p...
AbstractThe current article focus on the ordinary Bernoulli, Euler and Genocchi numbers and polynomi...
In this paper, we study differential equations arising from the generating functions of the generali...
We recover a recurrence relation for representing in an easy form the coefficients $ A_{n,k} $ of th...
AbstractThis paper concerns the study of the Bell polynomials and the binomial type sequences. We ma...
AbstractThe exponential partial Bell polynomials are polynomials in an infinite number of variables ...
AbstractUsing the exponential generating function and the Bell polynomials, we obtain several new id...
In the paper, the authors study new degenerating approach to the Bell polynomials which are called f...
[[abstract]]The purpose of this paper is to establish several identities involving the partial Bell ...
AbstractThe well-known Faà di Bruno formula for higher derivatives of a composite function plays an ...
Feng Qi, Da-Wei Niu, and Dongkyu Lim, Notes on explicit and inversion formulas for the Chebyshev pol...
The authors establish a pair of closed-form expressions for special values of the Bell polynomials o...
Abstract The aim of this paper is to study the complete and incomplete degenerate Bell polynomials, ...
The following outlines my Ph.D thesis on Lagrange Inversion, Rogers-Ramanujan identities, and orthog...
AbstractUsing the finite difference calculus and differentiation, we obtain several new identities f...
AbstractWe define the generalized potential polynomials associated to an independent variable, and p...
AbstractThe current article focus on the ordinary Bernoulli, Euler and Genocchi numbers and polynomi...
In this paper, we study differential equations arising from the generating functions of the generali...
We recover a recurrence relation for representing in an easy form the coefficients $ A_{n,k} $ of th...
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