Pith. sign in

REVIEW

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

Not yet reviewed by Pith; the record is open.

This paper has not been read by Pith yet. Machine review is queued; the pith claim, tier, and objections will appear here once it completes.

SPECIMEN: schema-true, not a live event

T0 review · schema-true

One-sentence machine reading of the paper's core claim.

pith:XXXXXXXX · record.json · timestamp

arxiv 1303.0926 v4 pith:SM2STMDQ submitted 2013-03-05 cs.IT math.IT

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

classification cs.IT math.IT
keywords varphisigmaprimitiveinjectivemapsuniformitycompressingsequences
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
0 comments
read the original abstract

Let $p\geq3$ be a prime and $e\geq2$ an integer. Let $\sigma(x)$ be a primitive polynomial of degree $n$ over $Z/p^eZ$ and $G'(\sigma(x),p^e)$ the set of primitive linear recurring sequences generated by $\sigma(x)$. A compressing map $\varphi$ on $Z/p^eZ$ naturally induces a map $\hat{\varphi}$ on $G'(\sigma(x),p^e)$. For a subset $D$ of the image of $\varphi$,$\hat{\varphi}$ 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 $1-2(p-1)/(p^n-1)$ of primitive polynomials of degree $n$, a clear criterion on $\varphi$ is obtained to decide whether $\hat{\varphi}$ is injective w.r.t. $D$-uniformity, and the majority of maps on $Z/p^eZ$ induce injective maps on $G'(\sigma(x),p^e)$. Furthermore, a sufficient condition on $\varphi$ is given to ensure injectivity of $\hat{\varphi}$ w.r.t. $D$-uniformity. It follows from the sufficient condition that if $\sigma(x)$ is strongly primitive and the compressing map $\varphi(x)=f(x_{e-1})$, where $f(x_{e-1})$ is a permutation polynomial over $\mathbb{F}_{p}$, then $\hat{\varphi}$ is injective w.r.t. $D$-uniformity for $\emptyset\neq D\subset\mathbb{F}_{p}$. Moreover, we give three specific families of compressing maps which induce injective maps on $G'(\sigma(x),p^e)$.

discussion (0)

Sign in with ORCID, Apple, or X to comment. Anyone can read and Pith papers without signing in.