English

The D(2)-Property for some metacyclic groups

Algebraic Topology 2020-01-06 v1 K-Theory and Homology

Abstract

We study problems relating to the D(2)-Problem for metacyclic groups of type G(p,p1)G(p,p-1) where pp is an odd prime. Specifically we build on Nadim's thesis \cite{Jamil}, which showed that the Z[G(5,4)]\mathbb{Z}[G(5,4)]-module Z\mathbb{Z} admits a diagonal resolution and a minimal representative for the third syzygy Ω3(Z)\Omega_3(\mathbb{Z}) is R(2)[y1)R(2)\oplus[y-1). Motivated by this result, we show that the Z[G(p,p1)]\mathbb{Z}[G(p,p-1)]-module R(2)[y1)R(2)\oplus[y-1) is both full and straight for any odd prime pp. Given Johnson's work on the D(2)-Problem \cite{D2}, this leads to the conclusion that G(5,4)G(5,4) satisfies the D(2)-property, as well as providing a sufficient condition for the D(2)-property to hold for G(p,p1)G(p,p-1), namely the condition that R(2)[y1)R(2)\oplus[y-1) is a minimal representative for Ω3(Z)\Omega_3(\mathbb{Z}) over Z[G(p,p1)]\mathbb{Z}[G(p,p-1)], which we refer to as the condition M(p). Following this result, we prove a theorem which simplifies the calculations required to show that the condition M(p) holds. Finally, we carry out these calculations in the case where p=7p=7 and prove that the condition M(7) holds, which is sufficient to show that G(7,6)G(7,6) satisfies the D(2)-property.

Keywords

Cite

@article{arxiv.2001.00822,
  title  = {The D(2)-Property for some metacyclic groups},
  author = {Jason Vittis},
  journal= {arXiv preprint arXiv:2001.00822},
  year   = {2020}
}
R2 v1 2026-06-23T13:02:16.038Z