Let $a,b : V\to W$ be two morphisms of smooth complex analytic spaces.
Assume $a$ and $b$ are local analytic isomorphisms.
- Does the equalizer $U$ of $a,b$ exist as a smooth complex analytic space?
Let $a,b : V\to W$ be two morphisms of smooth complex analytic spaces.
Assume $a$ and $b$ are local analytic isomorphisms.
- Does the equalizer $U$ of $a,b$ exist as a smooth complex analytic space?