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Appartenenza a \(L^ p\) delle serie di Fourier aleatorie su gruppi non commutativi. (Italian) Zbl 0179.47603

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[1] W. Badé P.C. Curtis Jr , Embedding theorems for commutative Banach algebras , Pac. Journ. of Math. , 18 , ( 1966 ), pp. 391 - 409 . Article | MR 202001 | Zbl 0156.37002 · Zbl 0156.37002 · doi:10.2140/pjm.1966.18.391
[2] R.E. Edwards E. Hewitt , Pointwise limits for sequences of convolution operators , Acta Math. , 133 , ( 1966 ), pp. 181 - 217 . MR 177259 | Zbl 0161.11104 · Zbl 0161.11104 · doi:10.1007/BF02391777
[3] A. Figà-Talamanca e D. Rider , A theorem of Littlewood and lacunary series for compact groups , Pac. Journ. of Math. , 16 , ( 1966 ), pp. 505 - 514 . Article | MR 206626 | Zbl 0142.10501 · Zbl 0142.10501 · doi:10.2140/pjm.1966.16.505
[4] A. Figà-Talamanca e D. Rider , A theorem on random Fourier series on noncommutative groups , Pac. Journ. of Math. , 21 , ( 1967 ), pp. 487 - 492 . Article | MR 210831 | Zbl 0246.60005 · Zbl 0246.60005 · doi:10.2140/pjm.1967.21.487
[5] Helgason S. , Topologies of group algebras and a theorem of Littlewood , Trans. Amer. Mat. Soc. , 86 , ( 1957 ), 269 - 283 . MR 95428 | Zbl 0080.10204 · Zbl 0080.10204 · doi:10.1090/S0002-9947-1957-0095428-5
[6] E. Hewitt H.S. Zuckerman , Some theorems on lacunary Fourier series with extensions to compact groups , Trans. Amer. Math. Soc. 93 , ( 1959 ), pp. 1 - 19 MR 108685 | Zbl 0141.12601 · Zbl 0141.12601 · doi:10.2307/1993419
[7] Kahane J.P. , Series de Fourier aléatoires , Presses de l’Université de Montréal , Montréal , 1963 . MR 268586
[8] Loève M. , Probability theory , D. van Nostrand , Princeton , 1963 . MR 203748 | Zbl 0108.14202 · Zbl 0108.14202
[9] Seever G. , Measures on F-spaces, Thesis , University of California , Berkeley 1963 . · Zbl 0189.44902
[10] Zygmund A. , Trigonometric series , Cambridge Univ. Press , Cambridge 1959 . Zbl 0367.42001 · Zbl 0367.42001
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