Assume that $K,L$ are constant simplicial sets (i.e all the faces maps and the degenerancies maps are equal to the identity and $K_{i}=K_{0}$, $L_{i}=L_{0}$ for $i>0$). Assume that there is a simplicial homotopy between two maps $f,g\: : \: K\to L$. Then is $f=g$?
2025-01-13 05:21:33.1736745693
homotopy between constant simplicial sets
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