Second order Recurrences, quadratic number fields and cyclic codes

Abstract

Wall-Sun-Sun primes (shortly WSS primes) are defined as those primes p such that the period of the Fibonacci recurrence is the same modulo p and modulo p2. This concept has been generalized recently to certain second order recurrences whose characteristic polynomials admit as a zero the principal unit of Q(d), for some integer d>0. Primes of the latter type we call WSS(d). They correspond to the case when Q(d) is not p-rational. For such a prime p we study the weight distributions of the cyclic codes over Fp and Zp2 whose check polynomial is the reciprocal of the said characteristic polynomial. Some of these codes are MDS (reducible case) or NMDS (irreducible case).

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