DocumentCode
2254125
Title
A matrix form of the Brunn-Minkowski inequality
Author
Zamir, Ram ; Feder, Meir
Author_Institution
Cornell Univ., Ithaca, NY, USA
fYear
1995
fDate
17-22 Sep 1995
Firstpage
71
Abstract
The well known Brunn-Minkowski inequality (BMI) is one of the basic inequalities in geometry. The BMI is dual in some sense to the entropy-power inequality, which lower bounds the entropy power of the sum of independent random variables. The authors derive a matrix form for the BMI and discuss its applications. They note that the matrix BMI can be used to lower bound the volume of a projection of a lattice cell, and so it can find applications in calculating the effective number of codewords of lattice constellations or lattice quantizers satisfying spectral constraints
Keywords
determinants; information theory; matrix algebra; Brunn-Minkowski inequality; determinants; effective number of codewords; entropy-power inequality; independent random variables; lattice cell; lattice constellations; lattice quantizers; lower bound; matrix form; spectral constraints; Bismuth; Convolution; Geometry; Linear matrix inequalities; Random variables; Shape; Vectors;
fLanguage
English
Publisher
ieee
Conference_Titel
Information Theory, 1995. Proceedings., 1995 IEEE International Symposium on
Conference_Location
Whistler, BC
Print_ISBN
0-7803-2453-6
Type
conf
DOI
10.1109/ISIT.1995.531173
Filename
531173
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