Étale Endomorphisms of Smooth Affine Surfaces

We prove that every projective, geometrically reduced scheme of dimension n over an infinite field k of positive characteristic admits a finite morphism over some finite radicial extension k of k to projective n-space, étale away from the hyperplane H at infinity, which maps a chosen Weil divisor in

It this note we prove the following theorem. Let ? alg 1 (A 1 C ) be the algebraic fundamental group of the affine line over C, where C is the completion of the algebraic closure of F q ((1ÂT)), and F q is a field with q elements. If F q has at least four elements, then we show that there is a conti

We investigate the behavior of the test ideal of an excellent reduced ring of prime characteristic under base change. It is shown that if h A → D is a smooth homomorphism, then τ A D = τ D , assuming that all residue fields of A at maximal ideals are perfect and that formation of the test ideal comm

The notion of unramified morphisms of schemes is generalized in a natural way to the category of fine logarithmic schemes. There are given several equivalent conditions for a morphism of fine log schemes to be unramified: vanishing of the differential module, all fibres to be unramified and a local