English

Deconstructing the Welch Equation Using $p$-adic Methods

Number Theory 2016-09-05 v1 Cryptography and Security

Abstract

The Welch map xgx1+cx \rightarrow g^{x-1+c} is similar to the discrete exponential map xgxx \rightarrow g^x, which is used in many cryptographic applications including the ElGamal signature scheme. This paper analyzes the number of solutions to the Welch equation: gx1+cx(modpe)g^{x-1+c} \equiv x \pmod{p^e} where pp is a prime and gg is a unit modulo pp, and looks at other patterns of the equation that could possibly be exploited in a similar cryptographic system. Since the equation is modulo pep^e, where pp is a prime number, pp-adic methods of analysis are used in counting the number of solutions modulo pep^e. These methods include: pp-adic interpolation, Hensel's lemma and Chinese Remainder Theorem.

Cite

@article{arxiv.1608.05880,
  title  = {Deconstructing the Welch Equation Using $p$-adic Methods},
  author = {Abigail Mann and Adelyn Yeoh},
  journal= {arXiv preprint arXiv:1608.05880},
  year   = {2016}
}

Comments

19 pages

R2 v1 2026-06-22T15:25:21.431Z