Surjectivity of Engel Words on SL2(O) and PSL2(O2)

Abstract

The study of word maps and Waring-like problems has been widely pursued for finite simple groups, algebraic groups, and Lie groups. In this article, we study Engel word maps em(x, y) = [·s[[x, y], y ], ·s, y ] on certain linear groups over local rings, namely, SL2( R) and PSL2( R). We consider the commutative ring R to be either a complete, local principal ideal ring O, or a local principal ideal ring of finite length O. Suppose the characteristic of the residue field k Fq is ≠ 2. Under some mild conditions on q, we show that there exists a constant q0(m), such that for all q ≥ q0(m), all lifts in SL2(O) of non-scalar elements of SL2(k), are in the image of the m-th Engel word over SL2(O). We further show that all Engel word maps are surjective on PSL2(O2) where O2 is a local principal ideal ring of length two. This work generalizes similar results about the Engel word map over fields.