Mixed quantifier prefixes over Diophantine equations with integer variables

Abstract

In this paper we first review the history of Hilbert's Tenth Problem, and then study mixed quantifier prefixes over Diophantine equations with integer variables. For example, we prove that ∀2∃4 over Z is undecidable, that is, there is no algorithm to determine for any P(x1,…,x6)∈ Z[x1,…,x6] whether ∀ x1∀ x2∃ x3∃ x4∃ x5∃ x6(P(x1,…,x6)=0), where x1,…,x6 are integer variables. We also have some similar undecidable results with universal quantifies bounded, for example, ∃2∀2∃2 over Z with ∀ bounded is undecidable. We conjecture that ∀2∃2 over Z is undecidable.