Timeline for Modern reference for integral homology of a finitely generated abelian group
Current License: CC BY-SA 2.5
7 events
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| Dec 26, 2010 at 16:11 | comment | added | Daniel Moskovich | Hmmm... I wonder whether it's possible to get hold of Schafer's thesis. Thanks! | |
| Dec 26, 2010 at 15:32 | history | edited | Francesco Polizzi | CC BY-SA 2.5 |
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| Dec 26, 2010 at 15:22 | comment | added | Francesco Polizzi | I added a further reference. Schafer's thesis seems strictly relate to what you are looking for, unfortunately it seems that it was never published (at least with this title) | |
| Dec 26, 2010 at 15:09 | comment | added | Francesco Polizzi | I've looked at these papers some years ago. I remember that they consider the structure of the whole homology sequence $H_1(G,\mathbb{Z})$, $H_2(X, \mathbb{Z})$, $H_3(X,\mathbb{Z})$, $\ldots$, but I cannot remember whether they contain any explicit calculation of a single homology group. Unfortunately, at the moment I cannot access to JSTOR to check... | |
| Dec 26, 2010 at 14:01 | comment | added | Daniel Moskovich | Brown was where I began. But he doesn't do the integral homology, saying only that "the situation is more complicated" and refering the reader to Cartan. I glanced through the other two papers, and didn't find a calculation of $H_n(A,Z)$ or a reference to one. They seem to treat it basically as a parameter, and to work in terms of it. If I'm overlooking something, could you give me a page reference for where they make such a calculation? | |
| Dec 26, 2010 at 13:07 | history | edited | Francesco Polizzi | CC BY-SA 2.5 |
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| Dec 26, 2010 at 12:40 | history | answered | Francesco Polizzi | CC BY-SA 2.5 |