AbstractLet G be the Galois group of a Galois point for a plane curve C. An element of G induces a birational transformation of C. We study if it can be extended to a projective or birational transformation of the plane. In the course of the study we give the defining equation of a rational curve with the Galois point. Furthermore, we introduce a special birational transformation in order to make the defining equation into a simpler form
224 pages; in French; for Chapter 6, which contains a lot of figures, see http://people.math.jussieu...
AbstractWe study the relation between Galois points for plane curves and Cremona transformations. Fi...
224 pages; in French; for Chapter 6, which contains a lot of figures, see http://people.math.jussieu...
AbstractLet G be the Galois group of a Galois point for a plane curve C. An element of G induces a b...
AbstractWe study the relation between Galois points for plane curves and Cremona transformations. Fi...
Recently, the first author [3] classified finite groups obtained as automorphism groups of smooth pl...
AbstractIn this paper we investigate the problem of determining rational parametrizations of plane a...
AbstractFor a plane curve C, we call a point P∈P2 a Galois point with respect to C if the point proj...
AbstractFor an algebraic curve C/K defined by y2=xp+a (a∉Kp) with relative genus (p−1)/2 and absolut...
Let C be an irreducible plane curve of PG(2, K )where K is an algebraically closed field of characte...
Let C be an irreducible plane curve of PG(2, K )where K is an algebraically closed field of characte...
We present a variety of computational techniques dealing with algebraic curves both in the plane and...
AbstractFor an algebraic curveCwith genus 0 the vector spaceL(D) whereDis a divisor of degree 2 give...
AbstractLet Π:Xe→P1 (e≥0) be the rational ruled complex surface defined by OP1⊕OP1(−e) on P1, i.e., ...
Let X be a smooth projective curve of genus >1 over a field K which is finitely generated over th...
224 pages; in French; for Chapter 6, which contains a lot of figures, see http://people.math.jussieu...
AbstractWe study the relation between Galois points for plane curves and Cremona transformations. Fi...
224 pages; in French; for Chapter 6, which contains a lot of figures, see http://people.math.jussieu...
AbstractLet G be the Galois group of a Galois point for a plane curve C. An element of G induces a b...
AbstractWe study the relation between Galois points for plane curves and Cremona transformations. Fi...
Recently, the first author [3] classified finite groups obtained as automorphism groups of smooth pl...
AbstractIn this paper we investigate the problem of determining rational parametrizations of plane a...
AbstractFor a plane curve C, we call a point P∈P2 a Galois point with respect to C if the point proj...
AbstractFor an algebraic curve C/K defined by y2=xp+a (a∉Kp) with relative genus (p−1)/2 and absolut...
Let C be an irreducible plane curve of PG(2, K )where K is an algebraically closed field of characte...
Let C be an irreducible plane curve of PG(2, K )where K is an algebraically closed field of characte...
We present a variety of computational techniques dealing with algebraic curves both in the plane and...
AbstractFor an algebraic curveCwith genus 0 the vector spaceL(D) whereDis a divisor of degree 2 give...
AbstractLet Π:Xe→P1 (e≥0) be the rational ruled complex surface defined by OP1⊕OP1(−e) on P1, i.e., ...
Let X be a smooth projective curve of genus >1 over a field K which is finitely generated over th...
224 pages; in French; for Chapter 6, which contains a lot of figures, see http://people.math.jussieu...
AbstractWe study the relation between Galois points for plane curves and Cremona transformations. Fi...
224 pages; in French; for Chapter 6, which contains a lot of figures, see http://people.math.jussieu...
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