You are here

Concentration, Functional Inequalities and Isoperimetry

Christian Houdré, Michel Ledoux, Emanuel Milman, and Mario Milman, editors
Publisher: 
American Mathematical Society
Publication Date: 
2011
Number of Pages: 
211
Format: 
Paperback
Series: 
Contemporary Mathematics 545
Price: 
79.00
ISBN: 
9780821849712
Category: 
Proceedings
We do not plan to review this book.
  • S. Aida -- COH formula and Dirichlet Laplacians on small domains of pinned path spaces
  • N. Badr and G. Dafni -- Maximal characterization of Hardy-Sobolev spaces on manifolds
  • S. G. Bobkov -- On Milman's ellipsoids and $M$-position of convex bodies
  • S. G. Bobkov, M. Madiman, and L. Wang -- Fractional generalizations of Young and Brunn-Minkowski inequalities
  • R. Eldan and B. Klartag -- Approximately Gaussian marginals and the hyperplane conjecture
  • O. N. Feldheim and S. Sodin -- One more proof of the Erdős-Turán inequality, and an error estimate in Wigner's law
  • A. Figalli -- Quantitative isoperimetric inequalities with applications to the stability of liquid drops and crystals
  • R. L. Frank and E. H. Lieb -- Spherical reflection positivity and the Hardy-Littlewood-Sobolev inequality
  • A. Giannopoulos, G. Paouris, and P. Valettas -- On the existence of subgaussian directions for log-concave measures
  • A. V. Kolesnikov and R. I. Zhdanov -- On isoperimetric sets of radially symmetric measures
  • M. Ledoux -- From concentration to isoperimetry: Semigroup proofs
  • J. Martín and M. Milman -- Sobolev inequalities, rearrangements, isoperimetry and interpolation spaces
  • E. Milman -- Isoperimetric bounds on convex manifolds
  • F. Morgan -- The log-convex density conjecture