Positive definite collections of disks

Abstract

Let Q(z,w)=-Πk=1n [(z-ak)(w-ak)-Rk2]. M. Putinar and B. Gustafsson proved recently that the matrix Q(ai,aj), 1≤ i,j≤ n, is positive definite if disks |z-ai|<Ri form a disjoint collection. We extend this result on symmetric collections of discs with overlapping. More precisely, we show that in the case when the nodes aj are situated at the vertices of a regular n-gon inscribed in the unit circle and ∀ i: Ri R, the matrix Q(ai,aj) is positive definite if and only if R<n, where z=2n2-1 is the smallest -1 zero of the Jacobi polynomial Pn-2,-1(z), =[n/2].