Title :
Lower bounds on the linear complexity of the discrete logarithm in finite fields
Author :
Meidl, Wilfried ; Winterhof, Arne
Author_Institution :
Inst. of Discrete Math., Austrian Acad. of Sci., Vienna, Austria
fDate :
11/1/2001 12:00:00 AM
Abstract :
Let p be a prime, r a positive integer, q=pr, and d a divisor of p(q-1). We derive lower bounds on the linear complexity over the residue class ring Zd of a (q-periodic) sequence representing the residues modulo d of the discrete logarithm in Fq . Moreover, we investigate a sequence over Fq representing the values of a certain polynomial over Fq introduced by Mullen and White (1986) which can be identified with the discrete logarithm in Fq via p-adic expansions and representations of the elements of Fq with respect to some fixed basis
Keywords :
computational complexity; public key cryptography; sequences; cyclotomic geiterator; discrete logarithm; finite fields; linear complexity; linear recurring sequences; lower bounds; public-key cryptography; q-periodic sequence; residue class ring; Complexity theory; Computer aided software engineering; Galois fields; Mathematics; Modules (abstract algebra); Polynomials; Public key cryptography;
Journal_Title :
Information Theory, IEEE Transactions on
