Non commutative Lp spaces without the completely bounded approximation property

Abstract

For any 1≤ p ≤ ∞ different from 2, we give examples of non-commutative Lp spaces without the completely bounded approximation property. Let F be a non-archimedian local field. If p>4 or p<4/3 and r≥ 3 these examples are the non-commutative Lp-spaces of the von Neumann algebra of lattices in SLr(F) or in SLr(). For other values of p the examples are the non-commutative Lp-spaces of the von Neumann algebra of lattices in SLr(F) for r large enough depending on p. We also prove that if r ≥ 3 lattices in SLr(F) or SLr() do not have the Approximation Property of Haagerup and Kraus. This provides examples of exact C*-algebras without the operator space approximation property.