The long exact sequence of homotopy $n$-groups

Ulrik Buchholtz, Egbert Rijke

Published 2019-12-18Version 1

We introduce the notion of $n$-exactness for a short sequence $F\to E\to B$ of pointed types, and show that any fiber sequence $F\hookrightarrow E \twoheadrightarrow B$ of arbitrary types induces a short sequence $\|F\|_{n-1} \to \|E\|_{n-1} \to \|B\|_{n-1}$ that is $n$-exact at $\|E\|_{n-1}$. We explain how the indexing makes sense when interpreted in terms of $n$-groups, and we compare our definition to the existing definitions of an exact sequence of $n$-groups for $n=1,2$. In conclusion, we obtain the long $n$-exact sequence of homotopy $n$-groups of a fiber sequence.