English

Approximation properties for $p$-adic symplectic groups and lattices

Operator Algebras 2015-09-17 v1 Group Theory

Abstract

Let GG be the symplectic group Sp4Sp_4 over a non Archimedean local field of any characteristic. It is proved in this paper that for p[1,4/3)(4,]p\in[1,4/3)\cup (4,\infty] neither the group GG nor its lattices have the property of approximation by Schur multipliers on Schatten pp class (APpcbSchurAP_{pcb}^{Schur}) of Lafforgue and de la Salle. As a consequence, for any lattice Γ\Gamma in G,G, the associated non-commutative LpL^p space Lp(LΓ)L^p(L\Gamma) of its von Neumann algebra L(Γ)L(\Gamma) fails the operator space approximation property (OAP) and completely bounded approximation property (CBAP) for p[1,4/3)(4,].p\in[1,4/3)\cup (4,\infty]. Together with previous work [LdlS, HdL13a, HdL13b, dL], one can conclude that lattices in a higher rank algebraic group over any local field do not have the group approximation property (AP) of Haagerup and Kraus. It is also shown that on some lattice Γ\Gamma in Sp4Sp_4 over some local field, the constant function 11 cannot be approximated by radial functions with bounded (not necessarily completely bounded) Fourier multiplier norms on Cr(Γ)C^*_r(\Gamma), nor on Lp(LΓ)L^p(L\Gamma) for finite p>4.p>4.

Cite

@article{arxiv.1509.04814,
  title  = {Approximation properties for $p$-adic symplectic groups and lattices},
  author = {Benben Liao},
  journal= {arXiv preprint arXiv:1509.04814},
  year   = {2015}
}

Comments

19 pages

R2 v1 2026-06-22T10:57:50.931Z