Let $F_m$ be the free group on $m$ generators and let $G$ be a finite
nilpotent group of non square-free order; we show that for each $m\ge 2$ the
integral group ring ${\bf Z}[G\times F_m]$ has infinitely many stably free
modules of rank 1.Comment: 9 pages. The final publication is available at
  http://www.springerlink.com doi:10.1007/s00013-012-0432-

F.E.A. Johnson

P. M. Cohn

P.M. Cohn

R. G. Swan

Seamus O’Shea

W. Dicks

English

arXiv

Crossref

Archiv der Mathematik

Stably free modules over virtually free groups

We study stably free modules over various group rings Z[G], using the method of

Milnor patching. In particular, we construct innite sets of stably free modules

of rank one over various rings. Let Fn denote the free group on n generators. The

two classes of group rings under consideration are:

(i) Z[GxFn], where G is nite nilpotent and of non square-free order,

and n > 2;

(ii) Z[Q(12m) x C1], where Q(12m) is the binary polyhedral group

of order 12m.

The modules in question are constructed as pullbacks arising from bre square

decompositions of the group rings.

We also study the D(2)-problem of low-dimensional topology. We give

an affirmative answer to the D(2)-problem for the dihedral group of order 4n,

assuming the group ring Z[D4n] satisfies torsion free cancellation. By results of

Swan, Endo, and Miyata, this happens for a number of small primes n. Johnson

has shown that the groups D4n+2 satisfy the D(2)-property, but his result relies on

the fact that D4n+2 has periodic cohomology, a property not shared by D4n. This

forces us to introduce the torsion free cancellation hypothesis, and to explicitly

realize the group of k-invariants (Z/4n)

O'Shea, S

UCL Discovery

http://discovery.ucl.ac.uk/1383774/1/Thesis%20v.20.pdf

Stably free modules over virtually free groups

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