Constrained inhomogeneous spherical equations: average-case hardness

Abstract

In this paper we analyze computational properties of the Diophantine problem (and its search variant) for spherical equations Πi=1m zi-1 ci zi = 1 (and its variants) over the class of finite metabelian groups Gp,n=Zpn Zp, where n∈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).

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