Add to ORKGFix an algebrically closed field k with char(k) = 0. Let C be a projective nonsingular curve of genus 5 defined over k, and let W 14 ⊂ Pic4(C) be the subscheme of divisor classes of degree 4 and dimension 1. W 14 is a curve, which is irreducible and nonsingular of genus 11 if C is general, and can be identified with the singular locus of the theta divisorW4 ⊂ Pic4(C)
The main subject of this thesis is the CM class number one problem for curves of genus g, in the c...
Consider the curves on the (x; y)-plane parametrized by ¸ and given by the equation, y2 = x5 ¡ 5¸x+ ...
Let X C P-N be an irreducible non-degenerate variety. If the (h, k)-Grassmann secant variety G(h,k)(...
Let C be a non-hyperelliptic curve of genus g ≥ 5 over C, and let (J(C),Θ) be its principally polari...
Abstract: A non-tetragonal curve of genus 8 is a complete intersection of divisors in either P2×P2, ...
Let C(K) be the K-points of a smooth projective curve C of genus g > 1 and J(K) its Jacobian. Fixing...
A section K on a genus g canonical curve C is identified as the key tool to prove new results on the...
In this paper, we work in the framework of complex analytic varieties; without contrary mention, var...
A non-singular curve Yfi p3 of genus g is said to be canonical if its plane section is a canonical d...
We classify all irreducible curves in P4, of degree d and not lying on surfaces of degree s<<d, whos...
Assegnati degli interi $r,s_1,...,s_l$, sia $Cal C(r;s_1,...,s_l)$ l'insieme di tutte le curve $C$ d...
Let C be a smooth, absolutely irreducible genus 3 curve over a number field M. Suppose that the Jaco...
If $D/F$ is a division algebra of degree 3, then the Severi-Brauer variety of $D$, call it $X$, is ...
By using a computer we are able to pose a conjecture for the expected number of generators of the id...
We determine the maximal genus of irreducible projective curves of degree d, not contained on surfac...
The main subject of this thesis is the CM class number one problem for curves of genus g, in the c...
Consider the curves on the (x; y)-plane parametrized by ¸ and given by the equation, y2 = x5 ¡ 5¸x+ ...
Let X C P-N be an irreducible non-degenerate variety. If the (h, k)-Grassmann secant variety G(h,k)(...
Let C be a non-hyperelliptic curve of genus g ≥ 5 over C, and let (J(C),Θ) be its principally polari...
Abstract: A non-tetragonal curve of genus 8 is a complete intersection of divisors in either P2×P2, ...
Let C(K) be the K-points of a smooth projective curve C of genus g > 1 and J(K) its Jacobian. Fixing...
A section K on a genus g canonical curve C is identified as the key tool to prove new results on the...
In this paper, we work in the framework of complex analytic varieties; without contrary mention, var...
A non-singular curve Yfi p3 of genus g is said to be canonical if its plane section is a canonical d...
We classify all irreducible curves in P4, of degree d and not lying on surfaces of degree s<<d, whos...
Assegnati degli interi $r,s_1,...,s_l$, sia $Cal C(r;s_1,...,s_l)$ l'insieme di tutte le curve $C$ d...
Let C be a smooth, absolutely irreducible genus 3 curve over a number field M. Suppose that the Jaco...
If $D/F$ is a division algebra of degree 3, then the Severi-Brauer variety of $D$, call it $X$, is ...
By using a computer we are able to pose a conjecture for the expected number of generators of the id...
We determine the maximal genus of irreducible projective curves of degree d, not contained on surfac...
The main subject of this thesis is the CM class number one problem for curves of genus g, in the c...
Consider the curves on the (x; y)-plane parametrized by ¸ and given by the equation, y2 = x5 ¡ 5¸x+ ...
Let X C P-N be an irreducible non-degenerate variety. If the (h, k)-Grassmann secant variety G(h,k)(...