Or is there a theorem that rules it out?
What about general “existance theorems” for Kan simplicial structures?
]]>Suppose we have the sequence of sets , , , … Is there a Kan simplicial structure on this sequence of sets, that is not -coskeletal for some ?
To be more precise, is there a simplicial set (functor) with that is not -coskeletal for some ?
And very closely related: is there a simplicial set (functor) with (with ), that is not -coskeletal for some ?
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