Federer spectral sequence

The Federer spectral sequence is a means to compute homotopy groups of function spaces (track groups; cf. Homotopy group). Its $ E _ {2} $- stage consists of the singular cohomology (cf. Singular homology) of the source with coefficients in the homotopy groups of the target.

More specifically, let $ X $ and $ Y $ be connected topological spaces (cf. Connected space) and $ u : X \rightarrow Y $ a continuous mapping. The Federer spectral sequence for this situation is a second quadrant homology spectral sequence $ ( E _ {** } ^ {r} ,d ^ {r} ) $, with

$$ E _ {pq } ^ {2} = H ^ {- p } ( X; \pi _ {q} ( Y ) ) \textrm{ for } p + q \geq 0 $$

and $ E _ {pq } ^ {2} = 0 $ otherwise. Under appropriate finiteness conditions it converges to the homotopy group $ \pi _ {p + q } ( { \mathop{\rm map} } ( X,Y ) ,u ) $ of the space of continuous mappings from $ X $ to $ Y $.

In the literature, this spectral sequence occurs explicitly in [a1] and implicitly in [a2] (and is for this reason sometimes referred to as the Barratt–Federer spectral sequence). See [a3] or [a4] for later generalizations and modifications.

References