Math 176: Algebraic Geometry, Fall 2014- Assignment 8
1. Compute each of the following, where P = (0, 0).
(a) I(P, C ∩ D) where C = V(y - x2) and D = V(y2 + x3 - x2).
(b) I(P, C ∩ D) where C = V(y2 - x3) and D = V(y3 - x4).
2. Let C = V(f) where f ∈ k[x, y, z] be an irreducible curve on P2.
(a) If f has degree 3, prove that C has at most one singularity.
(b) If f has degree 4, prove that C cannot have three collinear double points.
3. Let P1, . . . , P5 ∈ P2 and assume no four of them are collinear. Show that there is a unique conic through P1, . . . , P5.
4. Let R be a commutative ring with a multiplicative identity 1. Let Spec(R), called the prime spectrum of R, be the set of prime ideals in R. For each ideal I of R, define
V(I) := {p ∈ Spec(R) : I ⊂ p}.
Prove the following:
(a) V({0}) = Spec(R); V(R) = ∅;
(b) V(I) ∪ V(J) = V(I ∩ J) for any ideals I, J of R
(c) V(I) ∩ V(J) = V(I + J) for any ideals I, J of R
What is this problem about?