Normal subgroups of the algebraic fundamental group of affine curves in positive characteristic

Let π₁(C) be the algebraic fundamental group of a smooth connected affine curve, defined over an algebraically closed field of characteristic p > 0 of countable cardinality. Let N be a normal (respectively, characteristic) subgroup of π ₁(C). Under the hypothesis that the quotient π ₁(C)/N admits an infinitely generated Sylow p-subgroup, we prove that N is indeed isomorphic to a normal (respectively, characteristic) subgroup of a free profinite group of countable cardinality. As a consequence, every proper open subgroup of N is a free profinite group of countable cardinality. Amílcar Pacheco and Pavel Zalesskii were partially supported by CNPq research grants 305731/2006-8 and 307823/2006-7, respectively. They were also supported by Edital Universal CNPq 471431/2006-0.     

Smooth degeneration of complete intersection curves in positive characteristic

Oblatum 2-V-1990 & 24-IX-1990     

On the ample vector bundles over curves in positive characteristic

Let E be an ample vector bundle over a smooth projective curve defined over an algebraically closed field of positive characteristic. We construct a family of curves in the total space of E, parametrized by an affine space, that surjects onto the total space of E and give a deformation of (nonreduced) zero section of E. To cite this article: I. Biswas, A.J. Parameswaran, C. R. Acad. Sci. Paris, Ser. I 339 (2004).     

Simple singularities of parametrized plane curves in positive characteristic

Let K be an algebraically closed field of characteristic p>0. The aim of the article is to give a classification of simple parametrized plane curve singularities over K. The idea is to give explicitly a class of families of singularities which are not simple such that almost all singularities deform to one of those and show that remaining singularities are simple.     

On maximal curves in characteristic two

The genus g of an q-maximal curve satisfies g=g ₁≔q(q−1)/2 or . Previously, q-maximal curves with g=g ₁ or g=g ₂, q odd, have been characterized up to q-isomorphism. Here it is shown that an q-maximal curve with genus g ₂, q even, is q-isomorphic to the non-singular model of the plane curve ∑ _{i =1}} ^t y ^{q /2 i} =x ^{q +1}, q=2 ^t , provided that q/2 is a Weierstrass non-gap at some point of the curve. Received: 3 December 1998     

Cycles on curves over global fields of positive characteristic

Let be a global field of positive characteristic, and let be a smooth projective curve. We study the zero-dimensional cycle group and the one-dimensional cycle group , addressing the conjecture that is torsion and is finitely generated. The main idea is to use Abhyankar's Theorem on resolution of singularities to relate the study of these cycle groups to that of the -groups of a certain smooth projective surface over a finite field.

     

On pi-algebras in positive characteristic

We use the BEST theorem in Graph Theory to study a non-alternating version of the standard identity in prime characteristic. Using these re-sults and the linearized Hamilton-Cayley identity, we show the existence of an element with reduced trace 1.     

The unramified Witt group of hyperelliptic curves in characteristic 2

The Witt group of a hyperelliptic curve over a field of characteristic different from two was determined by Parimala and Sujatha. Here, analogous results are obtained for the unramified Witt group in characteristic two using the analogue of Milnor's exact sequence for the Witt group of rational function fields developed earlier by the authors. In the elliptic case, if F is perfect and points of order two are rational, a generator and relation structure for the Witt group is given.     

On 3-manifolds with finite solvable fundamental group

Inventiones mathematicae -     

On the second cohomology of an algebraic group and of its lie algebra in a positive characteristic

Necessary and sufficient isomorphism conditions for the second cohomology group of an algebraic group with an irreducible root system over an algebraically closed field of characteristic p ≥ 3h ? 3, where h stands for the Coxeter number, and the corresponding second cohomology group of its Lie algebra with coefficients in simple modules are obtained, and also some nontrivial examples of isomorphisms of the second cohomology groups of simple modules are found. In particular, it follows from the results obtained here that, among the simple algebraic groups SL₂(k), SL₃(k), SL₄(k), Sp₄(k), and G ₂, nontrivial isomorphisms of this kind exist for SL₄(k) and G ₂ only. For SL₄(k), there are two simple modules with nontrivial second cohomology and, for G ₂, there is one module of this kind. All nontrivial examples of second cohomology obtained here are one-dimensional.     

Surfaces of positive curvature inE 3 whose characteristic curves form a Tchebychef net

In this paper, it is proved that the surfaces of positive curvature with no umbilical points in 3-dimensional Euclidean space whose characteristic curves form a Tchebychef net are translation surfaces and that the characteristic curves are represented on the unit sphere by a rhombic net. The determination of these surfaces depends on two elliptic integrals of the first kind. Furthermore, the case where these elliptic integrals reduce to elementary integrals is studied and it is shown that the surfaces corresponding to this case belong to one of the following two classes: (a) Translation surfaces of positive curvature with plane characteristic curves as generators lying in two planes intersecting each other under a constant angle. The special case where these planes are perpendicular gives an analogue of the Scherk's minimal surfaces of translation. (b) Translation surfaces of revolution of positive curvature with characteristic curves as generators which are circular helices.