Lecture
Curve of Genus 2: Very Ample Divisors
Description
This lecture covers the concept of very ample divisors on curves of genus 2, exploring the conditions under which a divisor is considered very ample and the implications of this property. The instructor explains the significance of the degree of the divisor and its relation to the genus of the curve, providing examples and demonstrating the application of the concept in various scenarios. The lecture also delves into the process of estimating divisors and the steps involved in determining the ampleness of a given divisor.
This video is available exclusively on Mediaspace for a restricted audience. Please log in to MediaSpace to access it if you have the necessary permissions.
Watch on MediaspaceInstructor
ex in magna
Cupidatat aliqua aliquip magna cupidatat exercitation laboris non anim. Reprehenderit ipsum velit dolor id commodo quis irure consequat quis Lorem ullamco voluptate laborum veniam. Laboris culpa voluptate est sunt deserunt incididunt nisi anim reprehenderit irure pariatur tempor nisi. Sunt ad aute excepteur dolor sunt eu et incididunt aute. Nostrud ea do qui elit et nostrud consectetur.
Official source
About this result
This page is automatically generated and may contain information that is not correct, complete, up-to-date, or relevant to your search query. The same applies to every other page on this website. Please make sure to verify the information with EPFL's official sources.
Ontological neighbourhood
Related lectures (31)
Applications of Serre Duality
Explores the applications of Serre duality in Enriques-Severi-Zariski lemma, foliations, and Riemann-Roch theorem.
Albanese and Fourier Transform: Positive Characteristic
Explores Albanese varieties, Fourier-Mukai transforms, and positive characteristic applications.
Topology of Riemann Surfaces
Covers the topology of Riemann surfaces, focusing on orientation and orientability.
Varieties with nef anti-canonical: Surjective Albanese
Presents a proof that smooth projective varieties with nef anti-canonical divisor have surjective Albanese morphism.
Local Homeomorphisms and Coverings
Covers the concepts of local homeomorphisms and coverings in manifolds, emphasizing the conditions under which a map is considered a local homeomorphism or a covering.