Exponential Riordan arrays and generalized Narayana polynomials
Abstract
Generalized Euler polynomials α n( x )=( 1-x )n+1Σm=0∞ pn( m )xm, where pn( x ) is the polynomial of degree n, are the numerator polynomials of the generating functions of diagonals of the ordinary Riordan arrays. Generalized Narayana polynomials n( x )=( 1-x )2n+1Σm=0∞ ( m+1 )...( m+n )pn( m )xm are the numerator polynomials of the generating functions of diagonals of the exponential Riordan arrays. In present paper we consider the constructive relationship between these two types of numerator polynomials.
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