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Huang, Ming-Deh; Kosters, Michiel; Petit, Christophe; Yeo, Sze Ling; Yun, Yang

Quasi-subfield Polynomials and the Elliptic Curve Discrete Logarithm Problem

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  • Media type: E-Article
  • Title: Quasi-subfield Polynomials and the Elliptic Curve Discrete Logarithm Problem
  • Contributor: Huang, Ming-Deh; Kosters, Michiel; Petit, Christophe; Yeo, Sze Ling; Yun, Yang
  • Published: Walter de Gruyter GmbH, 2020
  • Published in: Journal of Mathematical Cryptology, 14 (2020) 1, Seite 25-38
  • Language: Not determined
  • DOI: 10.1515/jmc-2015-0049
  • ISSN: 1862-2984; 1862-2976
  • Keywords: Applied Mathematics ; Computational Mathematics ; Computer Science Applications
  • Origination:
  • Footnote:
  • Description: AbstractWe initiate the study of a new class of polynomials which we call quasi-subfield polynomials. First, we show that this class of polynomials could lead to more efficient attacks for the elliptic curve discrete logarithm problem via the index calculus approach. Specifically, we use these polynomials to construct factor bases for the index calculus approach and we provide explicit complexity bounds. Next, we investigate the existence of quasi-subfield polynomials.
  • Access State: Open Access