It is currently Sun Dec 17, 2017 11:12 am


All times are UTC [ DST ]




Post new topic Reply to topic  [ 1 post ] 
Author Message
PostPosted: Sat Jan 16, 2016 11:24 pm 
Team Member

Joined: Tue Nov 10, 2015 8:25 pm
Posts: 309
Suppose that \( \mathcal{C} \) is a category with a zero object. Suppose that the morphism \( a \) is the kernel of a morphism \( \displaystyle \gamma : X \longrightarrow Y \). Show that if coker(\( a \)) exists, then \( a = \) ker(coker \( a \)).


Top
Offline Profile  
Reply with quote  

Display posts from previous:  Sort by  
Post new topic Reply to topic  [ 1 post ] 

All times are UTC [ DST ]


Mathimatikoi Online

Users browsing this forum: No registered users and 1 guest


You cannot post new topics in this forum
You cannot reply to topics in this forum
You cannot edit your posts in this forum
You cannot delete your posts in this forum
You cannot post attachments in this forum

Search for:
Jump to:  
Powered by phpBB® Forum Software © phpBB Group Color scheme created with Colorize It.
Theme created StylerBB.net