Title of article
A generalized Conner–Floyd conjecture and the immersion problem for low 2-torsion lens spaces
Author/Authors
Gonzلlez، نويسنده , , Jesْs، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2003
Pages
21
From page
907
To page
927
Abstract
Let α(d) denote the number of ones in the binary expansion of d. For 1⩽k⩽α(d) we prove that the 2(d+α(d)−k)+1-dimensional, 2k-torsion lens space does not immerse in a Euclidian space of dimension 4d−2α(d) provided certain technical condition holds. The extra hypothesis is easily eliminated in the case k=1 recovering Davis’ strong non-immersion theorem for real projective spaces. For k>1 this is a deeper problem (solved only in part) that requires a close analysis of the interaction between the Brown–Peterson 2-series and its 2k analogue. The methods are based on a partial generalization of the Brown–Peterson version for the Conner–Floyd conjecture used in this context to detect obstructions for the existence of Euclidian immersions.
Keywords
Immersions of manifolds , Lens spaces , 2k-series , Conner–Floyd conjecture , Brown–Peterson homology
Journal title
Topology
Serial Year
2003
Journal title
Topology
Record number
1545394
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