The first relative k-invariant
Abstract
Motivated by work on the homotopy classification of 4-manifolds with boundary, we define a relative k-invariant for pairs of spaces that are homotopy equivalent to CW pairs. We show that for such a pair (X,Y) with Postnikov 2-type X P2(X), the relative k-invariant is the obstruction to the existence of a section Bπ1(X) P2(X) extending Y X P2(X). Given CW pairs (X0,Y0) and (X1,Y1), as well as a map h Y0 Y1, we also prove that relative k-invariants provide a complete obstruction to constructing a map X0(3) Y0 X1 that extends h and induces given isomorphisms on π1 and π2.
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