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Anisotropic random walks on free products of cyclic groups, irreducible representations and idempotents of C*reg(G)

Published online by Cambridge University Press:  22 January 2016

Gabriella Kuhn*
Affiliation:
Universita di Milano, Dipartimento di Matematica, “Federigo Enriques” 20133 Milano, Italia
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Let be the free product of q + 1 copies of Zn+1 and let denote its Cayley graph (with respect to aj, 1 ≤ jq + 1). We may think of G as a group acting on the “homogeneous space” , This point of view is inspired by the case of SL2(R) acting on the hyperbolic disk and is developed in [FT-P] [I-P] [FT-S] [S] (but see also [C]).

Since G is a group we may investigate some classical topics: the full (reductive) C* algebra, its dual space, the regular Von Neumann algebra and so on. See [B] [P] [L] [V] and also [H]. These approaches give results pointing up the analogy between harmonic analysis on these groups and harmonic analysis on more classical objects.

Type
Research Article
Copyright
Copyright © Editorial Board of Nagoya Mathematical Journal 1992

References

[A] Aomoto, K. and Kato, Y., Green functions and spectra on free products of cyclic groups, Ann. Inst. Fourier, T.38 (3988) Fase. 1, 5985.Google Scholar
[B] Bozeiko, M., Uniformely bounded representations of free groups, J. Reine Angew. Math., 377 (1987), 170186 Google Scholar
[C] Cartier, P., Harmonic analysis on trees, Proc. Symp. Pure Math., Amer. Math. Soc, 26 (1972), 419424.Google Scholar
[C-FT] Cecchini, C. and Figà-Talamanca, A., Projections of uniqueness for LD(G) , Pacific J. Math., 51 (1974), 3747.CrossRefGoogle Scholar
[C-S] Cartwright, D.I. and Soardi, P.M., Random walks on free products quotient and amalgams, Nagoya Math. J., 102 (1986), 163180.Google Scholar
[D-S] Dunford, N. and Schwartz, J.T., Linear operators, Interscience, New York,(1963).Google Scholar
[FT-S] Figà-Talamanca, A. and Steger, T., Harmonic analysis for anisotropic random walks on homogeneous trees, to appear in Memories A.M.S.Google Scholar
[H] Haagerup, U., An example of a non-nuclear C*-algebra which has the metric approximation property, Invent. Math., 50 (1979), 279293.Google Scholar
[K-S] Kuhn, G. and Steger, T., Restrictions of the special representation of Aut(Tree3) to two cocompact subgroups, to appear in Rocky Mountain J. Math.Google Scholar
[I-P] Iozzi, A. and Picardello, M., Spherical functions on symmetrical graphs, Harmonic Analysis, Proceedings Cortona, Italy, Springer Lecture Notes in Math., 992 344387.CrossRefGoogle Scholar
[L] Lance, E.C., if-theory for certain group C*-algebras, Acta Matematica, 151 (1983), 209230.Google Scholar
[ML] McLaughlin, J.C., Random walks and convolution operators, Doctoral Dissertation, New York Univ., (1986).Google Scholar
[M] Mlotkowsky, W., Positive definite radial functions on free products of groups, Boll. U.M.I., (7) 2B, (1988), 5366.Google Scholar
[P] Pytlik, T., Radial functions on free groups and decompositionof the regular representation into irreducible components, J. Reine Angew. Math., 326 (1981), 124135.Google Scholar
[P-S] Pytlik, T. and Szwarc, R., An analytic family of uniformly bounded representations of free groups, Acta Matematica, 157 (1986), 287309.CrossRefGoogle Scholar
[T1] Trenholme, A.R., Maximal abelian subalgebras of function algebras associated with free products, J. Funct. Anal., 79 (1988), 342350.Google Scholar
[T2] Trenholme, A.R., Trenholme, A Green’s function for non-homogeneous random walks on free products, Math. Z., 199 (1988), 425441.Google Scholar
[S] Steger, T., Harmonic analysis for anisotropic random walks on homogeneous trees, Doctoral Dissertation, Washington Univ., St. Louis, (1985).Google Scholar
[V] Voiculescu, D., Addition of certain non-commuting random variables, J. Funct. Anal., 66 N.3, (1986), 323346.CrossRefGoogle Scholar
[W] Woess, W., Nearest neighbour random walks on free products of discrete groups, Boll. U.M.I., (6) 5B, (1986), 961982.Google Scholar