inverse image उदाहरण वाक्य

The " fibers " are by definition the subspaces of that are the inverse images of points of.
The flatness of ? ensures that the inverse image of " Z " continues to have codimension one.
Then Zariski's connectedness theorem says that the inverse image of any normal point of " Y " is connected.
The easy way to remember the definitions above is to notice that finding an inverse image is used in both.
A cartesian section is thus a ( strictly ) compatible system of inverse images over objects of " E ".

For example, it can be shown that an inverse image f ^ {-1 } [ 0 ] is a non-Borel set.
There are also domain to sheaves and morphisms on the codomain, and an inverse image functor operating in the opposite direction.
However, it is a direct consequence of the definition that two such inverse images are isomorphic in " F T ".
The twisted inverse image functor f ^ ! is, in general, only defined as a functor between Grothendieck duality and Verdier duality.
To do this requires two steps : First compute an inverse image of each point to be visited; then sort the values.