ABSTRACT
A new method of analyzing the linear complexity of 2nd order nonlinear filterings of -sequences that is based on the concept of regular coset is presented. The procedure considers any value of the LFSR’s length, (prime or composite number). Emphasis is on the geometric interpretation of the regular cosets which produce degeneracies in the linear complexity of the filtered sequence. Numerical expressions to compute the linear complexity of such sequences are given as well as practical rules to design 2nd order nonlinear filterings which preserve the maximal linear complexity are stated.
1991 Mathematics Subject Classification: 11K45, 94A55.