Title :
Irreducible Polynomials Which Divide Trinomials Over GF (2)
Author :
Golomb, Solomon W. ; Lee, Pey-Feng
Author_Institution :
Dept. of Electr. Eng., Univ. of Southern California, Los Angeles, CA
Abstract :
The simplest linear shift registers to generate binary sequences involve only two taps, which corresponds to a trinomial over GF(2). It is therefore of interest to know which irreducible polynomials f(x) divide trinomials over GF(2), since the output sequences corresponding to f(x) can be obtained from a two-tap linear feedback shift register (with a suitable initial state) if and only if f(x) divides some trinomial t(x)=xm+xa+1 over GF(2). In this paper, we develop the theory of which irreducible polynomials do, or do not, divide trinomials over GF(2). Then some related problems such as Artin´s conjecture about primitive roots, and the conjectures of Blake, Gao, and Lambert, as well as of Tromp, Zhang, and Zhao are discussed
Keywords :
Galois fields; binary sequences; polynomials; GF; binary sequence; irreducible polynomial; two-tap linear feedback shift register; Application software; Binary sequences; Bit error rate; Error correction codes; Linear feedback shift registers; Polynomials; Radar applications; Radar measurements; Shift registers; Wireless communication; Irreducible polynomial; linear feedback shift register sequence; primitive polynomial; trinomial;
Journal_Title :
Information Theory, IEEE Transactions on
DOI :
10.1109/TIT.2006.889714
