When is hyponormality for 2-variable weighted shifts invariant under powers?

Abstract

For 2-variable weighted shifts W(α,β)(T1, T2) we study the invariance of (joint) k- hyponormality under the action (h,) -> W(α,β)(h,)(T1, T2):=(T1k,T2) (h, >=1). We show that for every k >= 1 there exists W(α,β)(T1, T2) such that W(α,β)(h,)(T1, T2) is k-hyponormal (all h>=2,>=1) but W(α,β)(T1, T2) is not k-hyponormal. On the positive side, for a class of 2-variable weighted shifts with tensor core we find a computable necessary condition for invariance. Next, we exhibit a large nontrivial class for which hyponormality is indeed invariant under all powers; moreover, for this class 2-hyponormality automatically implies subnormality. Our results partially depend on new formulas for the determinant of generalized Hilbert matrices and on criteria for their positive semi-definiteness.