Injectivity w.r.t. Distribution of Elements in the Compressed Sequences Derived from Primitive Sequences over Z/peZ

Abstract

Let p≥3 be a prime and e≥2 an integer. Let σ(x) be a primitive polynomial of degree n over Z/peZ and G'(σ(x),pe) the set of primitive linear recurring sequences generated by σ(x). A compressing map on Z/peZ naturally induces a map on G'(σ(x),pe). For a subset D of the image of , is called to be injective w.r.t. D-uniformity if the distribution of elements of D in the compressed sequence implies all information of the original primitive sequence. In this correspondence, for at least 1-2(p-1)/(pn-1) of primitive polynomials of degree n, a clear criterion on is obtained to decide whether is injective w.r.t. D-uniformity, and the majority of maps on Z/peZ induce injective maps on G'(σ(x),pe). Furthermore, a sufficient condition on is given to ensure injectivity of w.r.t. D-uniformity. It follows from the sufficient condition that if σ(x) is strongly primitive and the compressing map (x)=f(xe-1), where f(xe-1) is a permutation polynomial over Fp, then is injective w.r.t. D-uniformity for ≠ D⊂Fp. Moreover, we give three specific families of compressing maps which induce injective maps on G'(σ(x),pe).