Abstract
In Valiant developed an algebraic analogue of the theory of NP-completeness for computations of polynomials over a field. We further develop this theory in the spirit of structural complexity and obtain analogues of well-known results by Baker, Gill, and Solovay, Ladner, and Schöning.\par We show that if Valiant's hypothesis is true, then there is a p-definable family, which is neither p-computable nor \textitVNP-complete. More generally, we define the posets of p-degrees and c-degrees of p-definable families and prove that any countable poset can be embedded in either of them, provided Valiant's hypothesis is true. Moreover, we establish the existence of minimal pairs for \textitVP in \textitVNP.\par Over finite fields, we give a \emphspecific example of a family of polynomials which is neither \textitVNP-complete nor p-computable, provided the polynomial hierarchy does not collapse.\par We define relativized complexity classes VP^h and VNP^h and construct complete families in these classes. Moreover, we prove that there is a p-family h satisfying VP^h = VNP^h.
Highlights
One of the most important developments in theoretical computer science is the concept of NP-completeness
By σ-limit set in Ω✂ we shall understand a countable union of limits of cylinders
Theorem 3.3 Let ▲❚☎✎❯ be σ-limit sets of Ω✂ which are closed under finite variation
Summary
One of the most important developments in theoretical computer science is the concept of NP-completeness. (The latter condition is satisfied if the polynomial hierarchy does not collapse at the second level.) In the classical, as well as in the BSS-setting, only artificial problems are known to have such properties (We remark that Emerson [13] has transfered such results to the BSS-model.) Over infinite fields, we can construct VPh-complete and VNPh-complete families with respect to p-projection. This gives a proof for the existence of VNP-complete families, which is independent of Valiant’s intricate reduction for the permanent. We do not know whether there exists a p-family h such that VPh ✡ ☛ VNPh
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