Add to ORKGThis study involves the ultraspherical polynomials, the Legendre polynomials, the Tchebichef polynomials of the first kind, and the Tchebichef polynomials of the second kind
Abstract. Let wλ(x):=(1−x2) λ−1/2 and P (λ) n be the ultraspherical polynomials with respect to wλ(x...
AbstractA special case of the big q-Jacobi polynomials Pn(x;a,b,c;q), which corresponds to a=b=−c, i...
summary:In this contribution we deal with classical Jacobi polynomials orthogonal with respect to di...
AbstractIn the present work, some general relations between Jacobi and ultraspherical polynomials ar...
AbstractA formula expressing the ultraspherical coefficients of the general order derivative of an i...
We characterize the class of ultraspherical polynomials in between all symmetric orthogonal polynomi...
Alternative forms are proposed for the coefficients in the series expansions of certain orthogonal f...
We characterize the class of ultraspherical polynomials in between all symmetric orthogonal polynomi...
AbstractAlternative forms are proposed for the coefficients in the series expansions of certain orth...
AbstractKnop and Sahi introduced a family of non-homogeneous and non-symmetric polynomials, Gα(x;q,t...
AbstractA formula for the ultraspherical coefficients of the moments of one single ultraspherical po...
Plot the Legendre polynomials, which appear in many mathematical problems, notably those involving s...
AbstractA new Birkhoff-type quadrature formula associated with the extended ultraspherical nodes is ...
AbstractThe purpose of this note is to establish the connection between the ultraspherical polynomia...
We characterize the continuous q-ultraspherical polynomials in terms of the special form of the coef...
Abstract. Let wλ(x):=(1−x2) λ−1/2 and P (λ) n be the ultraspherical polynomials with respect to wλ(x...
AbstractA special case of the big q-Jacobi polynomials Pn(x;a,b,c;q), which corresponds to a=b=−c, i...
summary:In this contribution we deal with classical Jacobi polynomials orthogonal with respect to di...
AbstractIn the present work, some general relations between Jacobi and ultraspherical polynomials ar...
AbstractA formula expressing the ultraspherical coefficients of the general order derivative of an i...
We characterize the class of ultraspherical polynomials in between all symmetric orthogonal polynomi...
Alternative forms are proposed for the coefficients in the series expansions of certain orthogonal f...
We characterize the class of ultraspherical polynomials in between all symmetric orthogonal polynomi...
AbstractAlternative forms are proposed for the coefficients in the series expansions of certain orth...
AbstractKnop and Sahi introduced a family of non-homogeneous and non-symmetric polynomials, Gα(x;q,t...
AbstractA formula for the ultraspherical coefficients of the moments of one single ultraspherical po...
Plot the Legendre polynomials, which appear in many mathematical problems, notably those involving s...
AbstractA new Birkhoff-type quadrature formula associated with the extended ultraspherical nodes is ...
AbstractThe purpose of this note is to establish the connection between the ultraspherical polynomia...
We characterize the continuous q-ultraspherical polynomials in terms of the special form of the coef...
Abstract. Let wλ(x):=(1−x2) λ−1/2 and P (λ) n be the ultraspherical polynomials with respect to wλ(x...
AbstractA special case of the big q-Jacobi polynomials Pn(x;a,b,c;q), which corresponds to a=b=−c, i...
summary:In this contribution we deal with classical Jacobi polynomials orthogonal with respect to di...