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Intractability of Learning the Discrete Logarithm with Gradient-Based Methods

Machine Learning 2023-10-04 v1 Cryptography and Security

Abstract

The discrete logarithm problem is a fundamental challenge in number theory with significant implications for cryptographic protocols. In this paper, we investigate the limitations of gradient-based methods for learning the parity bit of the discrete logarithm in finite cyclic groups of prime order. Our main result, supported by theoretical analysis and empirical verification, reveals the concentration of the gradient of the loss function around a fixed point, independent of the logarithm's base used. This concentration property leads to a restricted ability to learn the parity bit efficiently using gradient-based methods, irrespective of the complexity of the network architecture being trained. Our proof relies on Boas-Bellman inequality in inner product spaces and it involves establishing approximate orthogonality of discrete logarithm's parity bit functions through the spectral norm of certain matrices. Empirical experiments using a neural network-based approach further verify the limitations of gradient-based learning, demonstrating the decreasing success rate in predicting the parity bit as the group order increases.

Keywords

Cite

@article{arxiv.2310.01611,
  title  = {Intractability of Learning the Discrete Logarithm with Gradient-Based Methods},
  author = {Rustem Takhanov and Maxat Tezekbayev and Artur Pak and Arman Bolatov and Zhibek Kadyrsizova and Zhenisbek Assylbekov},
  journal= {arXiv preprint arXiv:2310.01611},
  year   = {2023}
}

Comments

ACML 2023

R2 v1 2026-06-28T12:38:51.516Z