DocumentCode
745859
Title
A new inequality in discrete Fourier theory
Author
Quisquater, Michaël ; Preneel, Bart ; Vandewalle, Joos
Author_Institution
Dept. of Electr. Eng.-ESAT, COSIC. Katholieke Univ. Leuven, Heverlee, Belgium
Volume
49
Issue
8
fYear
2003
Firstpage
2038
Lastpage
2040
Abstract
Discrete Fourier theory has been applied successfully in digital communication theory. In this correspondence, we prove a new inequality linking the number of nonzero components of a complex valued function defined on a finite Abelian group to the number of nonzero components of its Fourier transform. We characterize the functions achieving equality. Finally, we compare this inequality applied to Boolean functions to the inequality arising from the minimal distance property of Reed-Muller codes.
Keywords
Boolean functions; Reed-Muller codes; cryptography; discrete Fourier transforms; Boolean functions; Fourier transform; Reed-Muller codes; complex valued function; digital communication theory; discrete Fourier theory; equality; finite Abelian group; inequality; minimal distance property; nonzero components; Autocorrelation; Boolean functions; Codes; Cryptography; Digital communication; Digital signal processing; Fourier transforms; Joining processes; Process design; Signal design;
fLanguage
English
Journal_Title
Information Theory, IEEE Transactions on
Publisher
ieee
ISSN
0018-9448
Type
jour
DOI
10.1109/TIT.2003.814492
Filename
1214083
Link To Document