p-bases and differential operators on varieties defined over a non-perfect field

Abstract

Let k be a possibly non-perfect field of characteristic p > 0. In this work we prove the local existence of absolute p-bases for regular algebras of finite type over k. Namely, consider a regular variety Z over k. Kimura and Niitsuma proved that, for every ∈ Z, the local ring OZ, has a p-basis over OZ,p. Here we show that, for every ∈ Z, there exists an open affine neighborhood of , say ∈ Spec(A) ⊂ Z, so that A admits a p-basis over Ap. This passage from the local ring to an affine neighborhood of has geometrical consequences, some of which will be discussed in the second part of the article. As we will see, given a p-basis B of the algebra A over Ap, there is a family of differential operators on A naturally associated to B. These differential operators will enable us to give a Jacobian criterion for regularity for varieties defined over k, as well as a method to compute the order of an ideal I ⊂ A.