The Use of Ultraproducts in Commutative Algebra

In spite of some recent applications of ultra products in algebra, they remain largely unknown to commutative algebraist, in part because they do not preserve basic properties such as Noetherianity. This work wants to make a strong case against these prejudices. More precisely, it studies ultra products of Noetherian local rings from a purely algebraic perspective, as well as how they can be used to transfer results between the positive and zero characteristics, to derive uniform bounds, to define tight closure in characteristic zero, and to prove asymptotic versions of homological conjectures in mixed characteristic. Some of these results are obtained using variants called chromatic products, which are often even Noetherian. This book, neither assuming nor using any logical formalism, is intended for algebraist and geometers, in the hope of popularizing ultra products and their applications in algebra.

The Use of Ultraproducts in Commutative Algebra