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Lévy type inequality for a class of finite metric spaces

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Martingale Theory in Harmonic Analysis and Banach Spaces

Part of the book series: Lecture Notes in Mathematics ((LNM,volume 939))

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References

  1. D. Amir and V. D. Milman, Unconditional and symmetric sets in n-dimensional normaed spaces, Israel J. Math., 37 (1980), 3–20.

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  2. W. B. Johnson and G. Schechtman, in preparation.

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  3. P. Lévy, Probléms concrets d’analyse fonctionelle, Gauthier Villars, Paris, 1951.

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  4. B. Maurey, Construction de suites symetriques, C.R.A.S. Paris, 288 (1979), 679–681.

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  5. W. F. Stout, Almost Sure Convergence, Academic Press, 1974.

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  6. D. L. Wang and P. Wang, Extremal configurations on a discrete torus and a generalization of the generalized Macaulay theorem, SIAM J. Appl. Math., 33 (1977), 55–59.

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Author notes

  1. Gideon Schechtman

    Present address: Department of Theoretical Mathematics, The Weizman Institute of Science, 76100, Rehovot, Israel

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    1. Gideon Schechtman
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    Jia-Arng Chao Wojbor A. Woyczyński

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    © 1982 Springer-Verlag

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    Schechtman, G. (1982). Lévy type inequality for a class of finite metric spaces. In: Chao, JA., Woyczyński, W.A. (eds) Martingale Theory in Harmonic Analysis and Banach Spaces. Lecture Notes in Mathematics, vol 939. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0096270

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    • DOI: https://doi.org/10.1007/BFb0096270

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    • Publisher Name: Springer, Berlin, Heidelberg

    • Print ISBN: 978-3-540-11569-4

    • Online ISBN: 978-3-540-39284-2

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