Zeros of polynomials orthogonal with respect to a signed weight

Abstract

In this paper we consider the polynomial sequence (Pnα,q(x)) that is orthogonal on [-1,1] with respect to the weight function x2q+1(1-x2)α(1-x), α>-1, q∈ N; we obtain the coefficients of the tree-term recurrence relation (TTRR) by using a different method from the one derived in kn:atia1; we prove that the interlacing property does not hold properly for (Pnα,q(x)); and we also prove that, if xn,nα+i,q+j is the largest zero of Pnα+i,q+j(x), x2n-2j,2n-2jα+j,q+j< x2n-2i,2n-2iα+i,q+i, 0≤ i<j≤ n-1.