Noe Barcenas, Luis Eduardo Garcia-Hernandez, Raphael Reinauer
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The Gromov-Lawson-Rosenberg Conjecture for Z/4xZ/4
We prove the Gromov-Lawson-Rosenberg Conjecture for the group Z/4xZ/4 by
computing the connective real k-homology of the classifying space with the
Adams spectral sequence and two types of detection theorems for the kernel of
the alpha invariant: one based on eta-invariants, closely following work of
Botvinnik-Gilkey-Stolz, and a second one based on homological methods. Along
the way, we determine differentials of the Adams spectral sequence for
classifying spaces involved in the computation, and we study the cap structure
of the Adams spectral sequence for sub-hopf algebras of the Steenrod algebra
relevant to the computation of connective real and complex k-homology.
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