Algebraic commutators with respect to subnormal subgroups in division rings

Abstract

Let D be a division ring and K a subfield of D which is not necessarily contained in the center F of D. In this paper, we study the structure of D under the condition of left algebraicity of certain subsets of D over K. Among results, it is proved that if D* contains a noncentral normal subgroup which is left algebraic over K of bounded degree d, then [D:F] d2. In case K=F, the obtained results show that if either all additive commutators or all multiplicative commutators with respect to a noncentral subnormal subgroup of D* are algebraic of bounded degree d over F, then [D:F] d2.