Norm asymptotics of orthogonal polynomials for general measures (Q1097448)

Let \(\mu\) be a fixed positive unit Borel measure with infinite support in the unit disk. A carrier of \(\mu\) is any Borel subset B of the support for which \(\mu (B)=1\), and another such measure \(\nu\) is carrier-related to \(\mu\) when it has the same carriers as \(\mu\). Let \(p_ n(z,v)\) be the monic orthogonal polynomial of degree n for v. We describe the possible asymptotics for the sequences \(\{\) (\(\int | p_ n(z,v)|^ 2dv)^{1/2n}\}_{n\geq 1}\) which are associated to the set of measures carrier-related to \(\mu\).