A H\"ormander-Mikhlin multiplier theory for free groups and amalgamated free products of von Neumann algebras

Abstract

We establish a platform to transfer Lp-completely bounded maps on tensor products of von Neumann algebras to Lp-completely bounded maps on the corresponding amalgamated free products. As a consequence, we obtain a H\"ormander-Mikhlin multiplier theory for free products of groups. Let F∞ be a free group on infinite generators \g1, g2,·s\. Given d1 and a bounded symbol m on Zd satisfying the classical H\"ormander-Mikhlin condition, the linear map Mm:C[F∞] C[F∞] defined by λ(g) m(k1,·s, kd)λ(g) for g=gi1k1·s ginkn∈F∞ in reduced form (with kl=0 in m(k1,·s, kd) for l>n), extends to a complete bounded map on Lp(F∞) for all 1<p<∞, where F∞ is the group von Neumann algebra of F∞. A similar result holds for any free product of discrete groups.