Isoperimetric problem for uniform enlargement

S. Bobkov

Studia Mathematica (1997)

  • Volume: 123, Issue: 1, page 81-95
  • ISSN: 0039-3223

Abstract

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We consider an isoperimetric problem for product measures with respect to the uniform enlargement of sets. As an example, we find (asymptotically) extremal sets for the infinite product of the exponential measure.

How to cite

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Bobkov, S.. "Isoperimetric problem for uniform enlargement." Studia Mathematica 123.1 (1997): 81-95. <http://eudml.org/doc/216380>.

@article{Bobkov1997,
abstract = {We consider an isoperimetric problem for product measures with respect to the uniform enlargement of sets. As an example, we find (asymptotically) extremal sets for the infinite product of the exponential measure.},
author = {Bobkov, S.},
journal = {Studia Mathematica},
keywords = {isoperimetric inequalities; uniform enlargement; isoperimetric problem for product measures},
language = {eng},
number = {1},
pages = {81-95},
title = {Isoperimetric problem for uniform enlargement},
url = {http://eudml.org/doc/216380},
volume = {123},
year = {1997},
}

TY - JOUR
AU - Bobkov, S.
TI - Isoperimetric problem for uniform enlargement
JO - Studia Mathematica
PY - 1997
VL - 123
IS - 1
SP - 81
EP - 95
AB - We consider an isoperimetric problem for product measures with respect to the uniform enlargement of sets. As an example, we find (asymptotically) extremal sets for the infinite product of the exponential measure.
LA - eng
KW - isoperimetric inequalities; uniform enlargement; isoperimetric problem for product measures
UR - http://eudml.org/doc/216380
ER -

References

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  14. [Sch] E. Schmidt, Die Brunn-Minkowskische Ungleichung und ihr Spiegelbild sowie die isoperimetrische Eigenschaft der Kugel in der euklidischen und nichteuklidischen Geometrie I, II, Math. Nachr. 1 (1948), 81-157; 2 (1949), 171-244. 
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