AbstractIn this paper, we derive some generating relations involving Hermite 2D polynomials (H2DP) Hm,n(U;x,y), of two variables with an arbitrary 2D matrix U as parameter using Lie-theoretic approach. Certain (known or new) generating relations for the polynomials related to H2DP are also obtained as special cases
AbstractWe construct examples of self-iterating Lie algebras similar to the Grigorchuk group. In cas...
AbstractIn a previous paper we have determined a generic formula for the polynomial solution familie...
AbstractWe give explicit polynomial generators for the homology rings of BSU and BSpin for complex o...
In this contribution we construct an orthogonal basis of Hermitean monogenic polynomials for the spe...
AbstractIncomplete forms of two-variable two-index Hermite polynomials are introduced. Their link wi...
AbstractThe purpose of this paper is to introduce and discuss a more general class of multiple Hermi...
AbstractWe discuss the properties of a new family of multi-index Lucas type polynomials, which are o...
AbstractSome aspects of duality for the classical orthogonal polynomials are explained. Duality deal...
We employ an umbral formalism to reformulate the theory of Hermite polynomials and the derivation of...
AbstractThe main object of the present work is to investigate several families of double-series iden...
AbstractGeneralized Jacobi polynomials constitute a complete system of orthogonal symmetric polynomi...
We develop a new method of umbral nature to treat blocks of Her mite and of Hermite like poly- nom...
AbstractThe main object of this paper is to construct a systematic investigation of a multivariable ...
AbstractThe main object of this paper is to investigate several general families of hypergeometric p...
AbstractIt is shown that an appropriate combination of methods, relevant to generalized operational ...
AbstractWe construct examples of self-iterating Lie algebras similar to the Grigorchuk group. In cas...
AbstractIn a previous paper we have determined a generic formula for the polynomial solution familie...
AbstractWe give explicit polynomial generators for the homology rings of BSU and BSpin for complex o...
In this contribution we construct an orthogonal basis of Hermitean monogenic polynomials for the spe...
AbstractIncomplete forms of two-variable two-index Hermite polynomials are introduced. Their link wi...
AbstractThe purpose of this paper is to introduce and discuss a more general class of multiple Hermi...
AbstractWe discuss the properties of a new family of multi-index Lucas type polynomials, which are o...
AbstractSome aspects of duality for the classical orthogonal polynomials are explained. Duality deal...
We employ an umbral formalism to reformulate the theory of Hermite polynomials and the derivation of...
AbstractThe main object of the present work is to investigate several families of double-series iden...
AbstractGeneralized Jacobi polynomials constitute a complete system of orthogonal symmetric polynomi...
We develop a new method of umbral nature to treat blocks of Her mite and of Hermite like poly- nom...
AbstractThe main object of this paper is to construct a systematic investigation of a multivariable ...
AbstractThe main object of this paper is to investigate several general families of hypergeometric p...
AbstractIt is shown that an appropriate combination of methods, relevant to generalized operational ...
AbstractWe construct examples of self-iterating Lie algebras similar to the Grigorchuk group. In cas...
AbstractIn a previous paper we have determined a generic formula for the polynomial solution familie...
AbstractWe give explicit polynomial generators for the homology rings of BSU and BSpin for complex o...
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