Orthogonal polynomials associated with an inverse quadratic spectral transform

Abstract

Let \Pn \n0 be a sequence of monic orthogonal polynomials with respect to a quasi--definite linear functional u and \Qn \n0 a sequence of polynomials defined by Qn(x)=Pn(x)+sn Pn-1(x)+tn Pn-2(x), n1, with tn = 0 for n2. We obtain a new characterization of the orthogonality of the sequence \Qn \n0 with respect to a linear functional v, in terms of the coefficients of a quadratic polynomial h such that h(x)v= u. We also study some cases in which the parameters sn and tn can be computed more easily, and give several examples. Finally, the interpretation of such a perturbation in terms of the Jacobi matrices associated with \Pn \n0 and \Qn \n0 is presented.