The long exact sequence of homotopy n-groups
Abstract
Working in homotopy type theory, we introduce the notion of n-exactness for a short sequence F E B of pointed types, and show that any fiber sequence F E B of arbitrary types induces a short sequence \|F\|n-1 \|E\|n-1 \|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. As the main application, we obtain the long n-exact sequence of homotopy n-groups of a fiber sequence.
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