Small Ball Probabilities for Linear Images of High-Dimensional Distributions

Author(s): Rudelson, Mark; Vershynin, Roman | Abstract: We study concentration properties of random vectors of the form $AX$, where $X = (X_1, ..., X_n)$ has independent coordinates and $A$ is a given matrix. We show that the distribution of $AX$ is well spread in space whenever the distributions of $X_i$ are well spread on the line. Specifically, assume that the probability that $X_i$ falls in any given interval of length $T$ is at most $p$. Then the probability that $AX$ falls in any given ball of radius $T \|A\|_{HS}$ is at most $(Cp)^{0.9 r(A)}$, where $r(A)$ denotes the stable rank of $A$ and $C$ is an absolute constant.

[1]  P. Levy Théorie de l'addition des variables aléatoires , 1955 .

[2]  A. Kolmogorov,et al.  Sur les propriétés des fonctions de concentrations de M. P. Lévy , 1958 .

[3]  B. A. Rogozin On the Increase of Dispersion of Sums of Independent Random Variables , 1961 .

[4]  C. Esseen On the Kolmogorov-Rogozin inequality for the concentration function , 1966 .

[5]  Gábor Halász On the distribution of additive arithmetic functions , 1975 .

[6]  E. Lieb,et al.  Best Constants in Young's Inequality, Its Converse, and Its Generalization to More than Three Functions , 1976 .

[7]  G. Halász Estimates for the concentration function of combinatorial number theory and probability , 1977 .

[8]  K. Ball Cube slicing in ⁿ , 1986 .

[9]  K. Ball Volumes of sections of cubes and related problems , 1989 .

[10]  G. Pisier The volume of convex bodies and Banach space geometry , 1989 .

[11]  B. Bollobás THE VOLUME OF CONVEX BODIES AND BANACH SPACE GEOMETRY (Cambridge Tracts in Mathematics 94) , 1991 .

[12]  Q. Shao,et al.  Gaussian processes: Inequalities, small ball probabilities and applications , 2001 .

[13]  E. Lieb,et al.  Analysis, Second edition , 2001 .

[14]  Marion Kee,et al.  Analysis , 2004, Machine Translation.

[15]  M. Rudelson,et al.  The smallest singular value of a random rectangular matrix , 2008, 0802.3956.

[16]  T. Tao,et al.  From the Littlewood-Offord problem to the Circular Law: universality of the spectral distribution of random matrices , 2008, 0810.2994.

[17]  M. Rudelson,et al.  Non-asymptotic theory of random matrices: extreme singular values , 2010, 1003.2990.

[18]  Roman Vershynin,et al.  Introduction to the non-asymptotic analysis of random matrices , 2010, Compressed Sensing.

[19]  G. Paouris Small ball probability estimates for log-concave measures , 2012 .

[20]  M. Rudelson,et al.  Hanson-Wright inequality and sub-gaussian concentration , 2013 .

[21]  Silouanos Brazitikos Geometry of Isotropic Convex Bodies , 2014 .