AbstractWe study polynomials orthogonal on a uniform grid. We show that each weight function gives two potentials and each potential leads to a structure relation (lowering operator). These results are applied to derive second order difference equations satisfied by the orthogonal polynomials and nonlinear difference equations satisfied by the recursion coefficients in the three-term recurrence relations
AbstractWe find explicit formulas for raising and lowering first order differential operators for or...
AbstractDifference calculus compatible with polynomials (i.e., such that the divided difference oper...
AbstractWe study a class of sieved Pollaczek polynomials defined by a second-order difference equati...
AbstractWe study polynomials orthogonal on a uniform grid. We show that each weight function gives t...
We consider multiple orthogonal polynomials associated with the exponential cubic weight e^{−x^3} ov...
AbstractThe q-difference analog of the classical ladder operators is derived for those orthogonal po...
Abstract The q− difference analog of the classical ladder operators is derived for those orthogonal ...
AbstractIn this paper, we present explicit formulas for discrete orthogonal polynomials over the so-...
AbstractWe study a sequence of polynomials orthogonal with respect to a one-parameter family of weig...
AbstractWe consider a class of polynomials Qn(x) defined by Qn(x) = (x + bn) Pn−1 (x) + dnPn (x), n ...
AbstractIn this work, the coefficients of orthogonal polynomials are obtained in closed form. Our fo...
AbstractThis paper analyzes polynomials orthogonal with respect to the Sobolev inner product ϕ̃(f,g)...
AbstractWe study properties of the dual orthogonal polynomials (OP) introduced by de Boor and Saff a...
AbstractIn this paper we will consider two algorithms which allow us to obtain second order linear d...
AbstractSome particular examples of classical and quantum systems on the lattice are solved with the...
AbstractWe find explicit formulas for raising and lowering first order differential operators for or...
AbstractDifference calculus compatible with polynomials (i.e., such that the divided difference oper...
AbstractWe study a class of sieved Pollaczek polynomials defined by a second-order difference equati...
AbstractWe study polynomials orthogonal on a uniform grid. We show that each weight function gives t...
We consider multiple orthogonal polynomials associated with the exponential cubic weight e^{−x^3} ov...
AbstractThe q-difference analog of the classical ladder operators is derived for those orthogonal po...
Abstract The q− difference analog of the classical ladder operators is derived for those orthogonal ...
AbstractIn this paper, we present explicit formulas for discrete orthogonal polynomials over the so-...
AbstractWe study a sequence of polynomials orthogonal with respect to a one-parameter family of weig...
AbstractWe consider a class of polynomials Qn(x) defined by Qn(x) = (x + bn) Pn−1 (x) + dnPn (x), n ...
AbstractIn this work, the coefficients of orthogonal polynomials are obtained in closed form. Our fo...
AbstractThis paper analyzes polynomials orthogonal with respect to the Sobolev inner product ϕ̃(f,g)...
AbstractWe study properties of the dual orthogonal polynomials (OP) introduced by de Boor and Saff a...
AbstractIn this paper we will consider two algorithms which allow us to obtain second order linear d...
AbstractSome particular examples of classical and quantum systems on the lattice are solved with the...
AbstractWe find explicit formulas for raising and lowering first order differential operators for or...
AbstractDifference calculus compatible with polynomials (i.e., such that the divided difference oper...
AbstractWe study a class of sieved Pollaczek polynomials defined by a second-order difference equati...