Author 
Message 
seldnplan@gmail.com science forum beginner
Joined: 30 Dec 2005
Posts: 8

Posted: Fri Jun 23, 2006 2:30 pm Post subject:
Are inclusions of open subspaces monomorphisms of ringed spaces?



It is true in the category of schemes that open immersions are
monomorphisms, but I can only prove this fact from the fact that for
any ring R and any element f in R the localization map R\to R_f is an
epimorphism. Can this be proved in general for ringed spaces? More
precisely, if I have a ringed space (X,O_X) and an open subspace
(U,O_U), where O_U is just the restriction of O_X to U, will the
natural inclusion U\subset X be a monomorphism of ringed spaces?
Thanks,
Keerthi 

Back to top 


LukasFabian Moser science forum beginner
Joined: 08 Apr 2005
Posts: 4

Posted: Fri Jun 23, 2006 7:30 pm Post subject:
Re: Are inclusions of open subspaces monomorphisms of ringed spaces?



Hallo,
On Fri, 23 Jun 2006 14:30:07 +0000 (UTC), seldnplan@gmail.com wrote:
Quote:  It is true in the category of schemes that open immersions are
monomorphisms, but I can only prove this fact from the fact that for
any ring R and any element f in R the localization map R\to R_f is an
epimorphism. Can this be proved in general for ringed spaces? More
precisely, if I have a ringed space (X,O_X) and an open subspace
(U,O_U), where O_U is just the restriction of O_X to U, will the
natural inclusion U\subset X be a monomorphism of ringed spaces?

What do you mean by "monomorphism"? If it's just that open immersions
can be cancelled from the left (i o f = i o g => f = g for an open
immersion i), this is of course true. One can see this by writing down
the definition of a composition of morphisms of ringed spaces and of
the (to a topological open immersion) associated morphism of sheaves;
but when doing so, one can just as well go on and prove the following
universal mapping property of open immersions: if U > X is an open
immersion then every morphism f: W > X with f^(1)(U) = W factors
uniquely through U.
Lukas 

Back to top 


Google


Back to top 



The time now is Tue Apr 24, 2018 6:17 pm  All times are GMT

