Bulk-boundary asymptotic equivalence of two strict deformation quantizations

Abstract

The existence of a strict deformation quantization of Xk=S(Mk(C)), the state space of the k× k matrices Mk(C) which is canonically a compact Poisson manifold (with stratified boundary) has recently been proven by both authors and K. Landsman LMV. In fact, since increasing tensor powers of the k× k matrices Mk(C) are known to give rise to a continuous bundle of C*-algebras over I=\0\ 1/N⊂[0,1] with fibers A1/N=Mk(C) N and A0=C(Xk), we were able to define a strict deformation quantization of Xk \`a la Rieffel, specified by quantization maps Q1/N: A0→ A1/N, with A0 a dense Poisson subalgebra of A0. A similar result is known for the symplectic manifold S2⊂R3, for which in this case the fibers A'1/N=MN+1(C) B(SymN(C2)) and A0'=C(S2) form a continuous bundle of C*-algebras over the same base space I, and where quantization is specified by (a priori different) quantization maps Q1/N': A0' → A1/N'. In this paper we focus on the particular case X2 B3 (i.e the unit three-ball in R3) and show that for any function f∈ A0 one has N∞||(Q1/N(f))|SymN(C2)-Q1/N'(f|_S2)||N=0, were SymN(C2) denotes the symmetric subspace of (C2)N . Finally, we give an application regarding the (quantum) Curie-Weiss model.