论文信息 - The cohomology ring of the sapphires that admit the Sol geometry

The cohomology ring of the sapphires that admit the Sol geometry

Let $G$ be the fundamental group of a sapphire that admits the Sol geometry and is not a torus bundle. We determine a finite free resolution of $\mathbb{Z}$ over $\mathbb{Z}G$ and calculate a partial diagonal approximation for this resolution. We also compute the cohomology rings $H^*(G; A)$ for $A = \mathbb{Z}$ and $A = \mathbb{Z}/p$ for an odd prime $p$, and indicate how to compute the groups $H^*(G; A)$ and the multiplicative structure given by the cup product for any system of coefficients $A$.

Daciberg Lima Gonçalves | Sérgio Tadao Martins | D. Gonçalves

[1] E. Lady. A COURSE IN HOMOLOGICAL ALGEBRA , 2022 .

[2] K. Morimoto. Some orientable 3-manifolds containing Klein bottles , 1985 .

[3] P. Zvengrowski,et al. Remarks on the cohomology of finite fundamental groups of 3-manifolds , 2009, 0904.1876.

[4] Charles Terence Clegg Wall,et al. Resolutions for extensions of groups , 1961, Mathematical Proceedings of the Cambridge Philosophical Society.

[5] Sérgio Tadao Martins,et al. Diagonal approximation and the cohomology ring of the fundamental groups of surfaces , 2014, 1404.0666.

[6] C. Thomas,et al. COHOMOLOGY OF GROUPS (Graduate Texts in Mathematics, 87) , 1984 .

[7] D. Handel. On products in the cohomology of the dihedral groups , 1993 .

[8] D. Gonçalves,et al. Nielsen numbers of selfmaps of Sol 3-manifolds , 2012 .

[9] R. L. Snider,et al. K0 and noetherian group rings , 1976 .

[10] Sérgio Tadao Martins. Diagonal approximation and the cohomology ring of torus fiber bundles , 2015, Int. J. Algebra Comput..

[11] Shicheng Wang,et al. Self-mapping degrees of torus bundles and torus semi-bundles , 2008, 0810.1799.

[12] W. Lück. L2-Invariants: Theory and Applications to Geometry and K-Theory , 2002 .