Maximal subrings of division rings

Abstract

The structure and the existence of maximal subrings in division rings are investigated. We see that if R is a maximal subring of a division ring D with center F and N(R)≠ U(R) \0\, where N(R) is the normalizer of R in D, then either R is a division ring with [D:R]l=[D:R]r is finite or R is an Ore G-domain with certain properties. In particular, if F⊂neq CD(R), the centralizer of R in D, then R=CD(β) is a division ring, for each β∈ CR(R) F, [D:R]l is finite if and only if β is algebraic over F, [D:R]l=[D:R]r=[F[β]:F] and CR(R)=F[β]. On the other hand if R does not contains F, then R F=CR(R) is a maximal subring of F. Consequently, if a division ring D has a noncentral element which is algebraic over the center of D, then D has a maximal subring. In particular, we prove that if D is a non-commutative division ring with center F, then either D has a maximal subring or dimF(D)≥ |F|. We study when a maximal subring of a division ring is a left duo ring or certain valuation rings. Finally, we prove that if D is an existentially complete division ring over a field K, then D has a maximal subring of the form CD(x) where D is finite over it. Moreover, if R is a maximal subring of D with K⊂neq CR(R), then R=CD(x) for some x∈ D K, which is algebraic over K.