Whitehead homomorphism

$ J $- homomorphism

A homomorphism from the stable homotopy group of the spectrum of $ \mathop{\rm SO} $ to the stable homotopy group of the spectrum of the sphere $ S ^ {0} $, defined in a special way. One construction of the Whitehead group is by the Hopf construction: A mapping $ \phi : S ^ {m} \rightarrow \mathop{\rm SO} ( q) $ determines a mapping $ ( J \phi ) : S ^ {m} \times S ^ {q-1} \rightarrow S ^ {q-1} $, which can be extended to a mapping $ J \phi : S ^ {m} \times E ^ {q} \rightarrow E _ {+} ^ {q} $ of $ S ^ {m} \times E ^ {q} $ to the upper hemi-sphere of $ S ^ {q} $. There is also an extension $ J \phi : E ^ {m+1} \times S ^ {q-1} \rightarrow E _ {-} ^ {q} $ to the lower hemi-sphere of $ S ^ {q} $, and this determines a mapping $ J \phi : S ^ {m+q} \rightarrow S ^ {q} $. This construction gives a mapping of homotopy classes, and so defines a homomorphism $ J: \pi _ {m} ^ {S} ( \mathop{\rm SO} ) \rightarrow \pi _ {m} ^ {S} ( S ^ {0} ) $, called the Whitehead group.

This homomorphism was first constructed by G.W. Whitehead , who also proved a theorem on the non-triviality of the infinite series of homotopy groups of spheres, $ \pi _ {n} ( S ^ {r} ) \neq 0 $, for the following values of $ n $ and $ r $:

The stable homotopy groups $ \pi _ {m} ^ {S} ( \mathop{\rm SO} ) $ are described by the Bott periodicity theorem [2]:

The image of the Whitehead homomorphism has been completely calculated (cf. [4], [5]): for $ m \equiv 0 $( $ \mathop{\rm mod} 8 $) and $ m> 0 $ the Whitehead group is a monomorphism and its image is a direct summand in the group $ \pi _ {m} ^ {S} ( S ^ {0} ) $; for $ m\equiv 1 $( $ \mathop{\rm mod} 8 $) and $ m> 1 $ the Whitehead group is a monomorphism on a direct summand of $ \pi _ {m} ^ {S} ( S ^ {0} ) $; for $ m= 4s- 1 $ the image of the Whitehead group is the cyclic group of order $ \tau ( 2s) $, giving a direct summand in $ \pi _ {m} ^ {S} ( S ^ {0} ) $, where $ \tau ( 2s) $ is the denominator of the irreducible fraction $ B _ {s} /( 4s) $, $ B _ {s} $ being the $ s $- th Bernoulli number (cf. Bernoulli numbers).

References

Comments

Given a mapping $ f: X \times Y \rightarrow Z $ of topological spaces, quite generally the Hopf construction gives a mapping

$$ \Gamma f : X \star Y \rightarrow SZ $$

from the join $ X \star Y $ of $ X $ and $ Y $ to the suspension $ SZ $ of $ Z $, as follows. Consider

$$ f \times \mathop{\rm id} : X \times Y \times I \rightarrow Z \times I,\ \ ( x, y, t) \mapsto ( f( x, y), t). $$

The join $ X \star Y $ is a certain quotient space of $ X \times Y \times Z $ and $ SZ $ is a quotient space of $ Z \times I $. An elementary check shows that $ f \times \mathop{\rm id} $ is compatible with the corresponding equivalence relations, and hence defines a mapping $ \Gamma f $ as desired. Recall that $ S ^ {m} \star S ^ {n} \cong S ^ {m+n+1} $, cf. Join.

Now, let $ \phi : S ^ {m} \rightarrow \mathop{\rm SO} ( q) $ be a mapping; each element of $ \mathop{\rm SO} ( q) $ induces a mapping $ S ^ {q-1} \rightarrow S ^ {q-1} $ of the $ ( q- 1) $- sphere into itself. Hence $ \phi $ induces a mapping

$$ \widetilde \phi : S ^ {m} \times S ^ {q-1} \rightarrow S ^ {q-1} . $$

Applying the Hopf construction to $ \widetilde \phi $ gives the mapping $ J \phi $:

$$ S ^ {m+q} \cong S ^ {m} \star S ^ {q-1} \mathop \rightarrow \limits ^ { {\Gamma \widetilde \phi }} \ S( S ^ {q-1} ) \cong S ^ {q} . $$

References