Resumen de A tool for locating zeros of orthogonal polynomials in Sobolev inner product spaces
Marcel G. de Bruin
In the theory of polynomials orthogonal with respect to an inner product of the form 〈f,〉 = ∫∞0f(x)g(x)dψ(x)+Σmk=1Akf(ik)(0)g(ik)(0), one is confronted with the following situation: for certain values of the parameters, the orthogonal polynomial of degree n does not have all its zeros inside the support of the distribution function dψ. This paper gives a method to investigate the zero distribution by looking at a type of limiting polynomial. For the case m = 2 it is shown that there are exactly two zeros outside the true interval of orthogonality for A1,A2 large; moreover, it is proved that these zeros are nonreal (complex conjugates) in the case i1 + 1 = i2. Also several examples are given.
