On Pro-2 Identities of 2×2 Linear Groups

Abstract

Let F be a free pro-p non-abelian group, and let be a commutative Noetherian complete local ring with a maximal ideal I such that char(/I)=p>0. In [Zu], Zubkov showed that when p≠2, the pro-p congruence subgroup GL21()=(GL2()/IGL2(/I)) admits a pro-p identity, i.e., there exists an element 1≠ w∈F that vanishes under any continuous homomorphism F GL21(). In this paper we investigate the case p=2. The main result is that when char()=2, the pro-2 group GL21() admits a pro-2 identity. This result was obtained by the use of trace identities that originate in PI-theory.