The Brascamp–Lieb inequalities: recent developments

Carbery, Anthony

  • Nonlinear Analysis, Function Spaces and Applications, Publisher: Institute of Mathematics of the Academy of Sciences of the Czech Republic(Praha), page 9-34

Abstract

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We discuss recent progress on issues surrounding the Brascamp–Lieb inequalities.

How to cite

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Carbery, Anthony. "The Brascamp–Lieb inequalities: recent developments." Nonlinear Analysis, Function Spaces and Applications. Praha: Institute of Mathematics of the Academy of Sciences of the Czech Republic, 2007. 9-34. <http://eudml.org/doc/221044>.

@inProceedings{Carbery2007,
abstract = {We discuss recent progress on issues surrounding the Brascamp–Lieb inequalities.},
author = {Carbery, Anthony},
booktitle = {Nonlinear Analysis, Function Spaces and Applications},
keywords = {Brascamp–Lieb inequalities},
location = {Praha},
pages = {9-34},
publisher = {Institute of Mathematics of the Academy of Sciences of the Czech Republic},
title = {The Brascamp–Lieb inequalities: recent developments},
url = {http://eudml.org/doc/221044},
year = {2007},
}

TY - CLSWK
AU - Carbery, Anthony
TI - The Brascamp–Lieb inequalities: recent developments
T2 - Nonlinear Analysis, Function Spaces and Applications
PY - 2007
CY - Praha
PB - Institute of Mathematics of the Academy of Sciences of the Czech Republic
SP - 9
EP - 34
AB - We discuss recent progress on issues surrounding the Brascamp–Lieb inequalities.
KW - Brascamp–Lieb inequalities
UR - http://eudml.org/doc/221044
ER -

References

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  1. Ball K. M., Volumes of sections of cubes and related problems, Geometric aspects of functional analysis (J. Lindenstrauss and V. D. Milman, eds.), Lecture Notes in Math. 1376, Springer, Heidelberg, 1989, pp. 251–260. Zbl 0674.46008, MR1008726 (90i:52019). (1989) Zbl0674.46008MR1008726
  2. Barthe F., On a reverse form of the Brascamp–Lieb inequality, Invent. Math. 134 (1998), no. 2, 335–361. Zbl 0901.26010, MR 99i:26021. (1998) Zbl0901.26010MR1650312
  3. Beckner W., Inequalities in Fourier analysis, Ann. Math. (2) 102 (1975), no. 1, 159–182. Zbl 0338.42017, MR 52 #6317. (1975) Zbl0338.42017MR0385456
  4. Bennett J. M., Carbery A., Christ M., Tao T., The Brascamp–Lieb inequalities: finiteness, structure and extremals, To appear in Geom. Funct. Anal. Zbl1132.26006MR2377493
  5. Bennett J. M., Carbery A., Christ M., Tao T., Finite bounds for Hölder–Brascamp–Lieb multilinear inequalities, To appear in Math. Res. Lett. MR2661170
  6. Bennett J. M., Carbery A., Tao T., On the multilinear restriction and Kakeya conjectures, Acta Math. 196 (2006), no. 2, 261–302. Zbl pre05114945, MR 2007h:42019. (196) MR2275834
  7. Brascamp H. J., Lieb E. H., Best constants in Young’s inequality, its converse, and its generalization to more than three functions, Adv. Math. 20 (1976), no. 2, 151–173. Zbl 0339.26020, MR 54 #492. (1976) Zbl0339.26020MR0412366
  8. Brascamp H. J., Lieb E. H., Luttinger J. M., A general rearrangement inequality for multiple integrals, J. Funct. Anal. 17 (1974), 227–237. Zbl 0286.26005, MR 49 #10835. (1974) Zbl0286.26005MR0346109
  9. Calderón A. P., An inequality for integrals, Studia Math. 57 (1976), no. 3, 275–277. Zbl 0343.26017, MR 54 #10531. (1976) Zbl0343.26017MR0422544
  10. Carlen E. A., Lieb E. H., Loss M., A sharp analog of Young’s inequality on S N and related entropy inequalities, J. Geom. Anal. 14 (2004), no. 3,487–520. Zbl 1056.43002, MR 2005k:82046. MR2077162
  11. Finner H., A generalization of Hölder’s inequality and some probability inequalities, Ann. Probab. 20 (1992), no. 4, 1893–1901. Zbl 0761.60013, MR 93k:60047. (1992) Zbl0761.60013MR1188047
  12. Lieb E. H., Gaussian kernels have only Gaussian maximizers, Invent. Math. 102 (1990), no. 1, 179–208. Zbl 0726.42005, MR 91i:42014. (1990) Zbl0726.42005MR1069246
  13. Loomis L. H., Whitney H., An inequality related to the isoperimetric inequality, Bull. Amer. Math. Soc. 55 (1949), 961–962. Zbl 0035.38302, MR 11,166d. (1949) Zbl0035.38302MR0031538
  14. Valdimarsson S. I., Two geometric inequalities, Ph.D. Thesis, University of Edinburgh, 2006. 
  15. Valdimarsson S. I., Optimisers for the Brascamp–Lieb inequality, Preprint. Zbl1159.26007MR2448061

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