MA40188: Algebraic curves
[Page last updated: 22 May 2025]
| Academic Year: | 2025/26 |
| Owning Department/School: | Department of Mathematical Sciences |
| Credits: | 6 [equivalent to 12 CATS credits] |
| Notional Study Hours: | 120 |
| Level: | Masters UG & PG (FHEQ level 7) |
| Period: |
|
| Assessment Summary: | EX 100% |
| Assessment Detail: |
|
| Supplementary Assessment: |
|
| Requisites: | Before taking this module you must take MA20217 |
| Learning Outcomes: |
At the end of the course students should be able to use homogeneous coordinates in projective space and to distinguish singular points of plane curves. They should be able to demonstrate an understanding of the difference between rational and nonrational curves, know examples of both, and be able to describe some special features of plane cubic curves. |
| Content: | To be chosen from: Affine and projective space. Polynomial rings and homogeneous polynomials. Ideals in the context of polynomial rings,the Nullstellensatz. Plane curves; degree; Bezout's theorem. Singular points of plane curves. Rational maps and morphisms; isomorphism and birationality. Curves of low degree (up to 3). Genus. Elliptic curves; the group law, nonrationality, the j invariant. Weierstrass p function. Quadric surfaces; curves of quadrics. Duals. |
| Aims: | This is an advanced pure mathematics course providing an introduction
to classical algebraic geometry via plane curves. It will show some of the links with other branches of mathematics.
|
| Course availability: |
MA40188 is Optional on the following courses:Department of Mathematical Sciences
|
Notes:
|