On Rieffel's conjecture characterizing a deformed algebra as Heisenberg smooth operators

Abstract

Let A be a unital C*-algebra and En be the Hilbert A-module defined as the completion of the A-valued Schwartz function space SA(Rn) with respect to the norm \|f\|2 := \| ∫Rn f(x)*f(x) \, dx \|A1 / 2. Also, let Ad U be the canonical action of the (2n + 1)-dimensional Heisenberg group by conjugation on the algebra of adjointable operators on En and let J be a skew-symmetric linear transformation on Rn. We characterize the smooth vectors under Ad U which commute with a certain algebra of right multiplication operators Rh, with h ∈ SA(Rn), where the product is ``twisted'' with respect to J according to a deformation quantization procedure introduced by M.A. Rieffel. More precisely, we establish that they coincide with an algebra of left multiplication operators and show that this solves, in particular, a conjecture posed by Rieffel.