Title:Studying the Diophantine problem in finitely generated rings and algebras via bilinear maps

Abstract:We study systems of polynomial equations in several classes of finitely generated rings and algebras. For each ring $R$ (or algebra) in one of these classes we obtain an interpretation by systems of equations of a ring of integers $O$ of a finite field extension of either $\mathbb{Q}$ or $\mathbb{F}_p(t)$, for some prime $p$ and variable $t$. This implies that the Diophantine problem (decidability of systems of polynomial equations) in $O$ is Karp-reducible to the same problem in $R$. In several cases we further obtain an interpretation by systems of equations of the ring $\mathbb{F}_p[t]$ in $R$, which implies that the Diophantine problem in $R$ is undecidable in this case. Otherwise, the ring $O$ is a ring of algebraic integers, and then the long-standing conjecture that $\mathbb{Z}$ is always interpretable by systems of equations in $O$ carries over to $R$. If true, it implies that the Diophantine problem in $R$ is also undecidable.
Some of the classes of f.g. rings studied in this paper are the following: all associative, commutative, non-unitary rings (a similar statement for the unitary case was obtained by Eisentraeger); all possibly non-associative, non-commutative non-unitary rings that are f.g. as an abelian group; and several classes of f.g. non-commutative rings. Analogous statements are obtained for algebras over f.g. associative commutative unitary rings.
Another contribution is the technique by which the aforementioned results are obtained: We show that given a bilinear map $f: A\times B \to C$ between f.g. abelian groups (or modules), under mild assumptions, there exists a certain ring (or algebra) $R$ with nice properties which is interpretable by systems of equations in the multi-sorted structure $(A,B,C;f)$. This result is not only relevant for rings and algebras, but also in other structures such as groups, as demonstrated previously by the authors.