Index Calculus Attacks on Hyperelliptic Jacobians with Effective Endomorphisms

Sulamithe Tsakou; Sorina Ionica

Paper 2021/721

Index Calculus Attacks on Hyperelliptic Jacobians with Effective Endomorphisms

Sulamithe Tsakou and Sorina Ionica

Abstract

For a hyperelliptic curve defined over a finite field $\bbbf_{q^n}$ with $n>1$, the discrete logarithm problem is subject to index calculus attacks. We exploit the endomorphism of the curve to reduce the size of the factorization basis and hence improve the complexity of the index calculus attack for certain families of ordinary elliptic curves and genus 2 hyperelliptic Jacobians defined over finite fields. This approach adds an extra cost when performing operation on the factor basis, but the experiences show that reducing the size of the factor basis allows to have a gain on the total complexity of index calculus algorithm with respect to the generic attacks.

Metadata

Available format(s): PDF
Category: Public-key cryptography
Publication info: Preprint. MINOR revision.
Keywords: elliptic curves index calculus attack
Contact author(s): sorina ionica @ u-picardie fr
sulamithe tsakou @ u-picardie fr
History: 2021-05-31: received
Short URL: https://ia.cr/2021/721
License: CC BY

BibTeX

@misc{cryptoeprint:2021/721,
      author = {Sulamithe Tsakou and Sorina Ionica},
      title = {Index Calculus Attacks on Hyperelliptic Jacobians with Effective Endomorphisms},
      howpublished = {Cryptology ePrint Archive, Paper 2021/721},
      year = {2021},
      note = {\url{https://eprint.iacr.org/2021/721}},
      url = {https://eprint.iacr.org/2021/721}
}