On arc fibers of morphisms of schemes

Abstract

Given a morphism f X Y of schemes over a field, we prove several finiteness results about the fibers of the induced map on arc spaces f∞ X∞ Y∞. Assuming that f is quasi-finite and X is separated and quasi-compact, our theorem states that f∞ has topologically finite fibers of bounded cardinality and its restriction to X∞ R∞, where R is the ramification locus of f, has scheme-theoretically finite reduced fibers. We also provide an effective bound on the cardinality of the fibers of f∞ when f is a finite morphism of varieties over an algebraically closed field, describe the ramification locus of f∞, and prove a general criterion for f∞ to be a morphism of finite type. We apply these results to further explore the local structure of arc spaces. One application is that the local ring at a stable point of the arc space of a variety has finitely generated maximal ideal and topologically Noetherian spectrum, something that should be contrasted with the fact that these rings are not Noetherian in general; a lower-bound to the dimension of these rings is also obtained. Another application gives a semicontinuity property for the embedding dimension and embedding codimension of arc spaces which extends to this setting a theorem of Lech on Noetherian local rings and translates into a semicontinuity property for Mather log discrepancies. Other applications are discussed in the paper.