Subnormality for arbitrary powers of 2-variable weighted shifts whose restrictions to a large invariant subspace are tensor products

Abstract

The Lifting Problem for Commuting Subnormals (LPCS) asks for necessary and sufficient conditions for a pair of subnormal operators on Hilbert space to admit commuting normal extensions. \ We study LPCS within the class of commuting 2-variable weighted shifts T (T1,T2) with subnormal components T1 and T2, acting on the Hilbert space 2(Z2+) with canonical orthonormal basis \e(k1,k2)\k1,k2 ≥ 0 . \ The core of a commuting 2-variable weighted shift T, c(T), is the restriction of T to the invariant subspace generated by all vectors e(k1,k2) with k1,k2 ≥ 1; we say that c(T) is of tensor form if it is unitarily equivalent to a shift of the form (I Wα, Wβ I), where Wα and Wβ are subnormal unilateral weighted shifts. \ Given a 2-variable weighted shift T whose core is of tensor form, we prove that LPCS is solvable for T if and only if LPCS is solvable for any power T(m,n):=(Tm1,Tn2) (m,n≥ 1). \