On the Kodaira dimension of maximal orders

Abstract

Let be an algebraically closed field of characteristic zero and a finitely generated field over . Let be a central simple -algebra, X a normal projective model of and a sheaf of maximal X-orders in . There is a ramification -divisor on X, which is related to the canonical bimodule ω by an adjunction formula. It only depends on the class of in the Brauer group of . When the numerical abundance conjecture holds true, or when is a central simple algebra, we show that the Gelfand-Kirillov dimension (or GK dimension) of the canonical ring of is one more than the Iitaka dimension (or D-dimension) of the log pair (X,). In the case that is a division algebra, we further show that this GK dimension is also one more than the transcendence degree of the division algebra of degree zero fractions of the canonical ring of . We prove that these dimensions are birationally invariant when the b-log pair determined by the ramification divisor has b-canonical singularities. In that case we refer to the Iitaka (or D-dimension) of (X,) as the Kodaira dimension of the order . For this, we establish birational invariance of the Kodaira dimension of b-log pairs with b-canonical singularities. We also show that the Kodaira dimension can not decrease for an embedding of central simple algebras, finite dimensional over their centres, which induces a Galois extension of their centres, and satisfies a condition on the ramification which we call an effective embedding. For example, this condition holds if the target central simple algebra has the property that its period equals its index.