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Random Fourier Series on Compact Noncommutative Groups

Published online by Cambridge University Press:  20 November 2018

Massimo A. Picardello*
Affiliation:
University of Maryland, College Park, Maryland
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1. Let G be a compact group, let I b e a subset of its dual object 𝚪, which, without loss of generality, will be assumed to be a countable subset. Let Di, iI , be irreducible representations of G of degree di. The Fourier series of a function F in L1(G) is denned by

where

Type
Research Article
Copyright
Copyright © Canadian Mathematical Society 1975

References

1. Cecchini, C., Lacunary Fourier series on compact Lie groups, J. Functional Analysis 11 (1972), 191203.Google Scholar
2. Figa'-Talamanca, A., Appartenenza a Lp délie série di Fourier aleatorie su gruppi non commutativi, Rend. Sem. Mat. Univ. Padova 39 (1967), 330348.Google Scholar
3. Figa'-Talamanca, A., Bounded and continuous Fourier series on noncommutative groups, Proc. Amer. Mat. Soc. 22 (1969), 573578.Google Scholar
4. Figa'-Talamanca, A., Random Fourier series on compact groups, in Theory of group representations and Fourier analysis (C.I.M.E., Montecatini, 1970).Google Scholar
5. Figa'-Talamanca, A. and Rider, D., A theorem of Littlewood and lacunary series for compact groups, Pacific J. Math. 16 (1966), 505514.Google Scholar
6. Figa'-Talamanca, A. and Rider, D., A theorem on random Fourier series on noncommutative groups, Pacific J. Math. 21 (1967), 487492.Google Scholar
7. Hewitt, E. and Ross, K. A., Abstract harmonic analysis, Vol. II (Springer-Verlag, Berlin, 1969).Google Scholar
8. Moore, C. C., Groups with finite dimensional irreducible representations, Trans. Amer. Math. Soc. 166 (1972), 401409.Google Scholar
9. Rider, D., Central lacunary sets (to appear).Google Scholar