1
vote
0answers
47 views

The localization exact sequence.

Let $X$ a scheme and $Y$ a close subscheme and $i:Y \to X$ the inclusion. Let $U:=(X-Y)$ and $j:U \to X$ the inclusion map. If I denote with $CH(-)$ the Chow group, the sequence $$ CH_r(Y) ...
2
votes
1answer
127 views

Showing that intersection multiplicity at a point is finite for prime divisors

My question has two parts two it: one vaguely more elementary, one perhaps less so. In Beauville (Complex Algebraic Surfaces), we define the multiplicity of intersection of two (irreducible, no ...
2
votes
0answers
129 views

Why does Fulton's Intersection Theory define $x \cdot_f y$ in this way?

His definition 8.1.1: Let $f:X\rightarrow Y$ be a morphism, with $Y$ non-singular of dimension $n.$ Let $p_X: X' \rightarrow X$, $p_Y: Y' \rightarrow Y$ be morphisms of schemes $X',Y'$ to $X$ and $Y$ ...
4
votes
1answer
520 views

Computation of normal cones

I am reading Fulton's intersection theory but I have a poor intuition about the normal cone. I know the cone $C_{Y/X}$ is the normal bundle if $Y\subset X$ is smooth. I would appreciate it if someone ...