Forcing algebra/Primary ideal/Induced torsor/Fact/Proof

We compute the cohomology class ${\displaystyle {}\delta (f)\in H^{1}(U,\operatorname {Syz} {\left(f_{1},\ldots ,f_{n}\right)})}$ and the cohomology class given by the forcing algebra. For the first computation we look at the short exact sequence

${\displaystyle 0\longrightarrow \operatorname {Syz} {\left(f_{1},\ldots ,f_{n}\right)}\longrightarrow {\mathcal {O}}_{U}^{n}{\stackrel {f_{1},\ldots ,f_{n}}{\longrightarrow }}{\mathcal {O}}_{U}\longrightarrow 0.}$

On ${\displaystyle {}D(f_{i})}$, the element ${\displaystyle {}f}$ is the image of ${\displaystyle {}\left(0,\ldots ,0,\,{\frac {f}{f_{i}}},\,0,\ldots ,0)\right)}$ (the non-zero entry is at the ${\displaystyle {}i}$th place). The cohomology class is therefore represented by the family of differences

${\displaystyle \left(0,\ldots ,0,\,{\frac {f}{f_{i}}},\,0,\ldots ,0,\,-{\frac {f}{f_{j}}},\,0,\ldots ,0\right)\in \Gamma (D(f_{i})\cap D(f_{j}),\operatorname {Syz} {\left(f_{1},\ldots ,f_{n}\right)}).}$

On the other hand, there are isomorphisms

${\displaystyle V{|}_{D(f_{i})}\longrightarrow T{|}_{D(f_{i})},\left(s_{1},\ldots ,s_{n}\right)\longmapsto \left(s_{1},\ldots ,s_{i-1},\,s_{i}+{\frac {f}{f_{i}}},\,s_{i+1},\ldots ,s_{n}\right).}$

The composition of two such isomorphisms on ${\displaystyle {}D(f_{i}f_{j})}$ is the identity plus the same section as before.