Module tensor product of subnormal modules need not be subnormal

Abstract

Let : D × D C be a diagonal positive definite kernel and let H denote the associated reproducing kernel Hilbert space of holomorphic functions on the open unit disc D. Assume that zf ∈ H whenever f ∈ H. Then H is a Hilbert module over the polynomial ring C[z] with module action p · f pf. We say that H is a subnormal Hilbert module if the operator Mz of multiplication by the coordinate function z on H is subnormal. %If 1 and 2 are two diagonal positive definite kernels then so is their pointwise (tensor) product :=12. In [Oper. Theory Adv. Appl, 32: 219-241, 1988], N. Salinas asked whether the module tensor product H_1 C[z] H_2 of subnormal Hilbert modules H_1 and H_2 is again subnormal. In this regard, we describe all subnormal module tensor products L2a( D, ws1) C[z] L2a( D, ws2), where L2a( D, ws) denotes the weighted Bergman Hilbert module with radial weight ws(z)=1s π|z|2(1-s)s~(z ∈ D, ~s > 0). In particular, the module tensor product L2a( D, ws) C[z] L2a( D, ws) is never subnormal for any s ≥ 6. Thus the answer to this question is no.