On the number of Galois points for a plane curve in positive characteristic,II

For a smooth plane curve , we call a point a Galois point if the point projection at P is a Galois covering. We study Galois points in positive characteristic. We give a complete classification of the Galois group given by a Galois point and estimate the number of Galois points for C in most cases.      

Galois points for a plane curve in characteristic two

Let C$C$ be an irreducible plane curve. A point P$P$ in the projective plane is said to be Galois with respect to C$C$ if the function field extension induced by the projection from P$P$ is Galois. We denote by δ^′(C)${\delta }^{\prime }\left(C\right)$ the number of Galois points contained in P²?C${\mathbb{P}}^2?C$. In this article we will present two results with respect to determination of δ^′(C)${\delta }^{\prime }\left(C\right)$ in characteristic two. First we determine δ^′(C)${\delta }^{\prime }\left(C\right)$ for smooth plane curves of degree a power of two. In particular, we give a new characterization of the Klein quartic in terms of δ^′(C)${\delta }^{\prime }\left(C\right)$. Second we determine δ^′(C)${\delta }^{\prime }\left(C\right)$ for a generalization of the Klein quartic, which is related to an example of Artin–Schreier curves whose automorphism group exceeds the Hurwitz bound. This curve has many Galois points.     

Galois points for a plane curve in arbitrary characteristic

In 1996, Hisao Yoshihara introduced a new notion in algebraic geometry: a Galois point for a plane curve is a point from which the projection induces a Galois extension of function fields. Yoshihara has established various new approaches to algebraic geometry by using Galois point or generalized notions of it. It is an interesting problem to determine the distribution of Galois points for a given plane curve. In this paper, we survey recent results related to this problem.      

Rational points and Galois points for a plane curve over a finite field

We study the relationship between rational points and Galois points for a plane curve over a finite field. It is known that the set of Galois points coincides with that of rational points of the projective plane if the curve is the Hermitian, Klein quartic or Ballico–Hefez curve. The author proposes a problem: Does the converse hold true? If the curve of genus zero or one has a rational point, we have an affirmative answer.     

On the number of rational points of a plane algebraic curve

The number of F_q -rational points of a plane non-singular algebraic curve defined over a finite field F_q is computed, provided that the generic point of is not an inflexion and that is Frobenius non-classical with respect to conics. Received: 18 March 2003     

On the plane section of an integral curve in positive characteristic

If is an integral curve and an algebraically closed field of characteristic 0, it is known that the points of the general plane section of are in uniform position. From this it follows easily that the general minimal curve containing is irreducible. If char, the points of may not be in uniform position. However, we prove that the general minimal curve containing is still irreducible.

     

Sziklai's conjecture on the number of points of a plane curve over a finite field III

We manage an upper bound for the number of rational points of a Frobenius nonclassical plane curve over a finite field. Together with previous results, the modified Sziklai conjecture is settled affirmatively.     

On Galois cohomology of semisimple groups over local and global fields of positive characteristic, III

We extend some well-known results on Galois cohomology in its relation with weak approximation for connected linear algebraic groups over number fields to the case of global fields of positive characteristic. Some applications are considered.     

On the number of rational points on a strictly convex curve

Let γ be a bounded convex curve on the plane. Then #(γ ∩ (?/n)²) = o(n ^2/3). This strengthens the classical result due to Jarník [J] (the upper bound cn ^2/3) and disproves the conjecture on the existence of a so-called universal Jarník curve.     

On the number of primitive lattice points in plane domains

We discuss the error term in the asymptotic formula for the number of integral points with coprime coordinates in star like plane domains assuming the validity of the Riemann Hypothesis.     

Curves containing all points of a finite projective Galois plane

In the projective plane $PG(2,q)$ over a finite field of order q, a Tallini curve is a plane irreducible (algebraic) curve of (minimum) degree $q+2$ containing all points of $PG(2,q)$. Such curves were investigated by G. Tallini [8], [9] in 1961, and by Homma and Kim [5] in 2013. Our results concern the automorphism groups, the Weierstrass semigroups, the Hasse–Witt invariants, and quotient curves of the Tallini curves.     

On the number of k-subsets of a set of n points in the plane

For a configuration S of n points in $\text{E}$², H. Edelsbrunner (personal communication) has asked for bounds on the maximum number of subsets of size k cut off by a line. By generalizing to a combinatorial problem, we show that for 2k < n the number of such sets of size at most k is at most 2nk ? 2k² ? k. By duality, the same bound applies to the number of cells at distance at most k from a base cell in the cell complex determined by an arrangement of n lines in $\text{P}$².     

On a plane convex arc with a large number of lattice points

  A convex are on which there are at least M ^{log 2/log 3} rational points of the form (u/M, v/M) is constructed. Bibliography: 10 titles. Translated from Zapiski Nauchnykh Semiriarov POMI, Vol. 357, 2008, pp. 22–32.     

On the number of singularities,zero curvature points and vertices of a simple convex space curve

We prove a generalization of the 4 vertex theorem forC ³ closed simple convex space curves including singular and zero curvature points.Work partially supported by CNPq. The second author is also grateful to the Universidade Federal de Viçosa (Brasil) for hospitality during the production of this work.