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J. Bourgain and V.D. Milman, Sections euclidiennes et volume des corps symetriques convexes dans ℝ n, C.R. Acad. Sc. Paris, t.300 Serie 1, N. 13 (1985) 435–438. (Also: New volume ratio properties for convex symmetric bodies in ℝ n, Invent. Math. 88, 319–340 (1987).
T. Figiel, N. Tomzcak-Jaegermann, Projections onto Hilbertion subspaces of Banach spaces. Israel J. Math. 53, 155–171 (1979).
Y. Gordon, On Milman's inequality and random subspaces which escape through a mesh on ℝ n, Gafa-Seminar 86–87, Lecture Notes in Mathematics, Springer-Verlag
H. König and V.D. Milman, On the covering numbers of convex bodies, GAFA-Israel Seminar, Springer-Verlag Lecture Notes in Math., 1267, 82–95 (1987).
D.R. Lewis, Ellipsoides defined by Banach ideal norms. Mathematica 26, 18–29 (1979).
K. Mahler, Ein Übertragungsprincip für konvexe Körper. Casopis Pest. Mat. Fys. 68, 93–102 (1939).
B. Maurey and G. Pisier, Series de variables aléatoires vectorielles indépendantes et propriétés géométriques des espaces de Banach, Studia Math. 58, 45–90 (1976).
V.D. Milman, Almost Euclidean quotient spaces of subspaces of finite dimensional normed spaces, Proc. AMS 94, 445–449 (1985).
V.D. Milman, Geometrical inequalities and mixed volumes in Local Theory of Banach Spaces, Asterisque 131, 373–400 (1985).
V.D. Milman, An inverse form of the Brunn-Minkowski inequality with applications to Local Theory of Normed Spaces, C.R. Acad. Sc. Paris, t. 302, Ser. I, No. 1, 25–28 (1986).
V.D. Milman, Concentration phenomenon and linear structure of finite dimensional normed spaces, Proceedings ICM, Berkeley 1986.
V.D. Milman, Some remarks on Urysohn's inequality and volume ratio of cotype 2-spaces, GAFA-Israel Seminar Notes, Springer-Verlag Lecture Notes in Math. 1267, 75–81 (1987).
V.D. Milman, Random subspaces of proportional dimension of finite dimensional normed spaces: Approach through the isoperimetric inequality, Banach Spaces, Proc. Missouri Conference 1984, Springer Lecture Notes # 1166, 106–115.
V.D. Milman and G. Schechtman, Asymptotic theory of finite dimensional normed spaces, Springer Lecture Notes #1200 (1986).
G. Pisier, Holomorphic semi-groups and the geometry of Banach spaces, Ann. of Math. 15, 375–392 (1982).
G. Pisier, Volume of convex bodies and geometry of Banach spaces (book in preparation).
G. Pisier, Probabilistic methods in the geometry of Banach spaces, Probability and Analysis, Springer-Verlag, Lecture Notes in Math. 1206, 167–241.
G. Pisier, A simpler proof of several results of Vitali Milman, Manuscript, March 86.
A. Pietsch, Operators Ideals, North Holland, 1987.
A. Pajor, N. Tomczak-Jaegermann, Remarques sur les nombres d'entropie d'un opérateur et de son transposé. C.R. Acad. Sci., Paris
C.A. Rogers, G.C. Shepard, The difference body of a convex body, Arch. Math. 8, 220–233 (1957).
L.A. Santalo, Un invariante afin pasa los cuerpos convexos del espacio de n dimensiones, Portugal Math. 8 (1949) 155–161.
V.N. Sudakov, Gaussian random processes an measures of solid angles in Hilbert spaces, Soviet Math. Dokl. 12, 412–415 (1971).
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Milman, V.D. (1988). Isomorphic symmetrization and geometric inequalities. In: Lindenstrauss, J., Milman, V.D. (eds) Geometric Aspects of Functional Analysis. Lecture Notes in Mathematics, vol 1317. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0081738
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DOI: https://doi.org/10.1007/BFb0081738
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