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References
Bozejko, M., Picardello, M.A.: Weakly amenable groups and amalgamated products. Proc. Am. Math. Soc.117(4) 1039–1046 (1993)
Cowling, M.: Rigidity for lattices in semisimple Lie groups: von Neumann algebras and ergodic actions. Rend. Semin. Math. Torino47 1–37 (1989)
Cowling, M., Haagerup, U.: Completely bounded multipliers of the Fourier algebra of a simple Lie group of real rank one. Invent. Math.96, 507–549 (1989)
De Cannière J. and Haagerup U.: Multipliers of the Fourier algebras of some simple Lie groups and their discrete subgroups. Am. J. Math.107 455–500 (1985)
Dorofaeff, B.: The Fourier algebra ofSl(2, ℝ) ⋊ ℝn,n ≥ 2 has no multiplier bounded approximate unit. Math. Ann.297 707–724 (1993)
Dorofaeff, B.: An Invariant Associated With Completely Bounded Approximate Units on the Fourier Algebra of a Lie Group. Uni. New South Wales: Ph.D. Thesis 1995
Eymard, P.: L'algèbre de Fourier d'un groupe localement compact. Bull. Soc. Math. Fr.92 181–236 (1964)
Haagerup, U.: GroupC *-algebras without the completely bounded approximation property. (Preprint 1986)
Lemvig Hansen, M.: Weak amenability of the universal covering group ofSU(1,n). Math. Ann.288 445–472 (1990)
Mostow, G.D.: The extensibility of local Lie groups of transformations and groups on surfaces. Ann. of Math.52, 606–636 (1950)
Paulsen, V.I.: Completely Bounded Maps and Dilations. (Pitman Res. Notes Math. 146) Essex: Longman 1986
Pier, J-P.: Amenable Locally Compact Groups. New York: Wiley-Interscience 1984
Szwarc, R.: Groups acting on trees and approximation properties of the Fourier algebra. J. Func. Anal.95 320–343 (1991)
Varadarajan, V.S.: Lie Groups, Lie Algebras and Their Representations. Englewood Cliffs New Jersey: Prentice Hall 1974
Valette, A.: Weak amenability of right-angled Coxeter groups. Proc. Am. Math. Soc.119, 1331–1334 (1993)
Wang, S.P.: The dual space of semi-simple Lie groups. Am. J. Math.91 921–937 (1969)