dc.contributor.author
Bokor, Imre
dc.identifier
https://ddd.uab.cat/record/38790
dc.identifier
urn:10.5565/PUBLMAT_34290_12
dc.identifier
urn:oai:ddd.uab.cat:38790
dc.identifier
urn:oai:raco.cat:article/37638
dc.identifier
urn:articleid:20144350v34n2p323
dc.description.abstract
The Hilton-Hopf quadratic form is defined for spaces of the homotopy type of a CW complex with one cell each in dimensions 0 and 4n, K cells in dimension 2n and no other cells. If two such spaces are of the same topological genus, then their Hilton-Hopf quadratic forms are of the same weak algebraic genus. For large classes of spaces, such as simply connected differentiable 4-manifolds, the converse is also true, as long as the suspensions of the spaces are also of the same topological genus. This note allays the conjecture that the converse is true in general by offering two techniques for generating infinite families of counterexamples.
dc.format
application/pdf
dc.relation
Publicacions matemàtiques ; V. 34 n. 2 (1990) p. 323-333
dc.rights
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dc.rights
https://rightsstatements.org/vocab/InC/1.0/
dc.title
On the connection between the topological genus of certain polyhedra and the algebraic genus of their Hilton-Hopf quadratic forms
