Transcendence Degree of Division Algebras

Abstract

We define a transcendence degree for division algebras, by modifying the lower transcendence degree construction of Zhang. We show that this invariant has many of the desirable properties one would expect a noncommutative analogue of the ordinary transcendence degree for fields to have. Using this invariant, we prove the following conjecture of Small. Let k be a field, let A be a finitely generated k-algebra that is an Ore domain, and let D denote the quotient division algebra of A. If A does not satisfy a polynomial identity then the Gelfand-Kirillov dimension of K is at most the Gelfand-Kirillov dimension of A minus 1 for every commutative subalgebra K of D.