English

On a cyclic structure of generators modulo primes

Number Theory 2026-03-11 v1

Abstract

In this paper, we introduce a new notion called the \textit{set of missing generators} M(g)\mathcal{M}(g) for a generator (or primitive element) gg of the cyclic group Zp\mathbb{Z}_p^*, where pp is an odd prime. The cardinality of M(g)\mathcal{M}(g) is established for all odd primes pp. For primes pp of the form 2iq1j1q2j2+12^iq_1^{j_1}q_2^{j_2}+1, the collection Vp={M(g):gG}V_p = \{ \mathcal{M}(g):g\in \mathcal{G} \} forms an equinumerous partition of G\mathcal{G} (the set of all generators of Zp\mathbb{Z}_p^*), and a digraph defined on the vertex set VpV_p is a disjoint collection of unicycles of the same size. Thus, for every such prime, an unique triplet (c,n,e)(c,n,e) of integers, describing the structure of the digraph of missing generators, can be associated. With the help of cyclic structure, we present a macroscopic additive property of generators of Zp\mathbb{Z}_p^*. Further, we show that factoring RSA numbers is computationally equivalent to computing T(p)T(p), under the assumption that there exists an absolute constant kk such that the set {2iNj+1:1i,j<logkN}\{2^iN^j+1: 1\leq i,j<\log^k N\} contains a prime for any given odd NN.

Keywords

Cite

@article{arxiv.2603.09345,
  title  = {On a cyclic structure of generators modulo primes},
  author = {Srikanth Ch and Shivarajkumar},
  journal= {arXiv preprint arXiv:2603.09345},
  year   = {2026}
}
R2 v1 2026-07-01T11:12:04.031Z