Deconstructing the Welch Equation Using $p$-adic Methods
Number Theory
2016-09-05 v1 Cryptography and Security
Abstract
The Welch map is similar to the discrete exponential map , which is used in many cryptographic applications including the ElGamal signature scheme. This paper analyzes the number of solutions to the Welch equation: where is a prime and is a unit modulo , and looks at other patterns of the equation that could possibly be exploited in a similar cryptographic system. Since the equation is modulo , where is a prime number, -adic methods of analysis are used in counting the number of solutions modulo . These methods include: -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}
}
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19 pages