Date: Sun, 24 Dec 1995 11:44:14 -0400 (AST) Subject: Query about citations Date: Fri, 22 Dec 1995 16:49:27 -0800 From: David B. Benson One defines the category of Diagrams on category A, Diag(A), as in Makkai & Pare's "Accessible Categories". One similarly defines the category of cones on diagrams on A and the category of cocones on diagrams on A. Limits and colimits exist when certain adjunctions hold between these derived categories. I am sure I have seen one or more papers or monographs giving the details for the above. I simply cannot recall where this (these) workout(s) appeared. I would like to (re)read the paper(s), so I would greatly appreciate receiving reminders about where to look for these results. Thank you in advance. With the warmest of season's greetings, David Date: Fri, 29 Dec 1995 10:22:24 -0400 (AST) Subject: Re: Query about citations Date: Fri, 29 Dec 1995 13:09:38 GMT From: Max Kelly In answer to David Benson's question of 22 Dec, a BETTER way of looking at the whole matter, which works even for weighted limits, is explained in Albert, H.M. and Kelly, G.M., The closure of a class of colimits, JPAA 51 (1988) 1--17 Regards, Max Kelly.