Division algebras and maximal orders for given invariants
Division algebras and maximal orders for given invariants
Brauer classes of a global field can be represented by cyclic algebras. Effective constructions of such algebras and a maximal order therein are given for $\mathbb{F}_{q}(t)$ , excluding cases of wild ramification. As part of the construction, we also obtain a new description of subfields of cyclotomic function fields.