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Do we have infinitely many forgetful functors for every pair of categories for which can those forgetful functors be constructed?

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 This question is unclear. What does "infinite forgetful functors" mean? Infinitely many? And what does "for which it can be constructed" mean? It might help to make clear what "it" refers to. – Hugh Thomas May 21 2010 at 23:16
Could you reformulate your question? As is, it is not meaningful. What is an "infinite forgetful functor"? Do you mean "infinitely many forgetful functors"? What is the "it" that "can be constructed"? – François G. Dorais May 21 2010 at 23:19
Yes, infinitely many. "It" refers to that amount of forgetful functors. – unknown May 21 2010 at 23:20
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 In any case, for the question to make sense, one needs a precise definition of "forgetful functor". To date I haven't seen any. – Anweshi May 21 2010 at 23:28
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 Even if your question is closed, you can edit it and make it better. When you're done editing flag the question to get the attention of a moderator who may reopen the question. – François G. Dorais May 22 2010 at 0:03
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closed as not a real question by François G. Dorais, Charles Siegel, Gjergji Zaimi, Yemon Choi, José Figueroa-O'Farrill May 21 2010 at 23:43

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