Intractability of Hilbert's Nullstellensatz implies algebraic hardness of permanent

Abstract

We study the logical relation of the P-NP separation conjecture in the Blum-Shub-Smale-model over the complex numbers with the P-NP separation conjecture in Valiant's algebraic model. This amounts to comparing Hilbert's Nullstellensatz Problem, that is, deciding feasibility of a given system of polynomial equations over the complex numbers, with the problem of evaluating the permanent of a given complex matrix. We compare the respective uniform models of computations and prove that PC NPC in the Blum-Shub-Smale-model over C implies the separation VP0(u) VNP0(u) of the uniform versions of Valiant's constant-free complexity classes over C. For the nonuniform models we show the analogous implication: the separation P0C(nu) NP0C(nu) of the nonuniform, constant-free Blum-Shub-Smale classes over C implies the separation VP0 VNP0 of Valiant's constant-free complexity classes over C. In the reverse direction, we conjecture that VNPC⊂eqVPC implies that PC(nu) NPC(nu).