Q Z is diophantine over Q with 32 unknowns

Abstract

In 2016 J. Koenigsmann refined a celebrated theorem of J. Robinson by proving that Q Z is diophantine over Q, i.e., there is a polynomial P(t,x1,…,xn)∈ Z[t,x1,…,xn] such that for any rational number t we have t∈ Z ∃ x1·s∃ xn[P(t,x1,…,xn)=0] where variables range over Q, equivalently t∈ Z ∀ x1·s∀ xn[P(t,x1,…,xn)=0]. In this paper we prove that we may take n=32. Combining this with a result of Z.-W. Sun, we show that there is no algorithm to decide for any f(x1,…,x41)∈ Z[x1,…,x41] whether ∀ x1·s∀ x9∃ y1·s∃ y32[f(x1,…,x9,y1,…,y32)=0], where variables range over Q.