Reducing the Computation of Linear Complexities of Periodic Sequences over GF(pm)
Abstract
The linear complexity of a periodic sequence over GF(pm) plays an important role in cryptography and communication [12]. In this correspondence, we prove a result which reduces the computation of the linear complexity and minimal connection polynomial of a period un sequence over GF(pm) to the computation of the linear complexities and minimal connection polynomials of u period n sequences. The conditions u|pm-1 and (n,pm-1)=1 are required for the result to hold. Some applications of this reduction in fast algorithms to determine the linear complexities and minimal connection polynomials of sequences over GF(pm) are presented.
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