Keywords
- Central Limit Theorem
- Convex Body
- Pointwise Convergence
- Convex Geometry
- Symmetric Convex Body
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References
Ball K.M. (1988) Logarithmically concave functions and sections of convex sets in R n. Studia Mathematica 88:69–84
Ball K.M. (1991) Normed spaces with a weak Gordon-Lewis property. In: Odell, Rosenthal (Eds.) U.T. Functional Analysis Seminar (1987–88), Lecture Notes 1470, Springer-Verlag, 36–47
Ball K.M. (1997) An elementary introduction to modern convex geometry. In: Levy S. (Ed.) Flavors of Geometry, Mathematical Sciences Research Institute Publications 31, Cambridge University Press
Bourgain J. (1991) On the distribution of polynomials on high-dimensional convex sets. In: Lindenstrauss J., Milman V.D. (Eds.) Israel Seminar on GAFA, Lecture Notes 1469, Springer-Verlag, 127–137
Feller W. (1966) An Introduction to Probability Theory and its Applications, Vol. 2, Wiley
Hensley D. (1980) Slicing convex bodies-bounds for slice area in terms of the body's covariance. Proc. Amer. Math. Soc. 79:619–625
Junge M. (1994) On the hyperplane conjecture for quotient spaces of L p . Forum Math. 6:617–635
König H., Meyer M., Pajor A. (1998) The isotropy constants of the Schatten classes are bounded. Math. Annalen 312:773–783
Milman V.D. (1986) Inégalité de Brunn-Minkowski inverse et applications à la théorie locale des éspaces normées. C. R. Acad. Sci. Paris 302:25–28
Milman V.D., Pajor A. (1989) Isotropic position and inertia ellipsoids and zonoids of the unit ball of an n-dimensional normed space. In: Lindenstrauss J., Milman V.D. (Eds.) Israel Seminar on GAFA, Lecture Notes 1376, Springer-Verlag, 107–131
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Ball, K. (2000). A remark on the slicing problem. In: Milman, V.D., Schechtman, G. (eds) Geometric Aspects of Functional Analysis. Lecture Notes in Mathematics, vol 1745. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0107205
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DOI: https://doi.org/10.1007/BFb0107205
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