Constrained inhomogeneous spherical equations: average-case hardness
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Published:2024-07-09
Issue:
Volume:Volume 16, Issue 1
Page:
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ISSN:1869-6104
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Container-title:journal of Groups, complexity, cryptology
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language:en
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Short-container-title:
Author:
Ushakov Alexander
Abstract
In this paper we analyze computational properties of the Diophantine problem
(and its search variant) for spherical equations $\prod_{i=1}^m z_i^{-1} c_i
z_i = 1$ (and its variants) over the class of finite metabelian groups
$G_{p,n}=\mathbb{Z}_p^n \rtimes \mathbb{Z}_p^\ast$, where $n\in\mathbb{N}$ and
$p$ is prime. We prove that the problem of finding solutions for certain
constrained spherical equations is computationally hard on average (assuming
that some lattice approximation problem is hard in the worst case).
Publisher
Centre pour la Communication Scientifique Directe (CCSD)