DocumentCode
1502296
Title
Sequences with almost perfect linear complexity profiles and curves over finite fields
Author
Xing, Chaoping ; Lam, Kwok Yan
Author_Institution
Sch. of Comput., Nat. Univ. of Singapore, Singapore
Volume
45
Issue
4
fYear
1999
fDate
5/1/1999 12:00:00 AM
Firstpage
1267
Lastpage
1270
Abstract
For stream ciphers, we need to generate pseudorandom sequences which are of properties of unpredictability and randomness. A important measure of unpredictability and randomness is the linear complexity profile (l.c.p.) la(n) of a sequence a. A sequence a is called almost perfect if the l.c.p. is la(n)=n/2+O(1). Based on curves over finite fields, we present a method to construct almost perfect sequences. We also illustrate our construction by explicit examples from the projective line and elliptic curves over the binary field
Keywords
binary sequences; computational complexity; cryptography; random processes; almost perfect linear complexity profiles; almost perfect sequences; binary field; elliptic curves; linear complexity profile; projective line; pseudorandom sequences; randomness; stream ciphers; unpredictability; Chaos; Codes; Elliptic curves; Galois fields; Length measurement; Linear feedback shift registers; Mathematics; Public key; Random sequences; Shift registers;
fLanguage
English
Journal_Title
Information Theory, IEEE Transactions on
Publisher
ieee
ISSN
0018-9448
Type
jour
DOI
10.1109/18.761282
Filename
761282
Link To Document