Undecidability of the first order theories of free non-commutative Lie algebras

Abstract

Let R be a commutative integral unital domain and L a free non-commutative Lie algebra over R. In this paper we show that the ring R and its action on L are 0-interpretable in L, viewed as a ring with the standard ring language +, ·,0. Furthermore, if R has characteristic zero then we prove that the elementary theory Th(L) of L in the standard ring language is undecidable. To do so we show that the arithmetic N = N, +,·,0 is 0-interpretable in L. This implies that the theory of Th(L) has the independence property. These results answer some old questions on model theory of free Lie algebras.