Homology of classifying space of spin group BSpin(n) - MathOverflow most recent 30 from http://mathoverflow.net 2013-05-24T17:21:21Z http://mathoverflow.net/feeds/question/114948 http://www.creativecommons.org/licenses/by-nc/2.5/rdf http://mathoverflow.net/questions/114948/homology-of-classifying-space-of-spin-group-bspinn Homology of classifying space of spin group BSpin(n) hbs 2012-11-30T01:17:35Z 2012-11-30T03:02:47Z <p>While dealing with $BO(n)$, $BSO(n)$ and $BSpin(n)$ with the universal coefficient theorem and Künneth formula, I came to have the following question:</p> <p>The universal coefficient says $H^n(X;M)\cong \hom(H_{n}(X;\mathbb{Z}),M)\oplus {\rm Ext}^{1} (H_{n-1}(X;\mathbb{Z},M))$ for a $\mathbb{Z}$-module $M$.</p> <p>When $X=BSpin(n)$, we know that $H^4(BSpin(n);\mathbb{Z})\cong \mathbb{Z}$ and it seems likely that once we know what $H_p(BSpin(n);\mathbb{Z})$ would be for $p=3,4$ we might be able to retrieve this isomorphism with the aid of universal coefficient theorem.</p> <p>So what would be $H_p(BSpin(n);\mathbb{Z})$ at least for $p=0,1,2,3,4$? </p> <p>(I have to say that the question is not about how to prove the isomorphism $H^4(BSpin(4);\mathbb{Z})\cong \mathbb{Z}$.)</p> <p>Thanks!</p> http://mathoverflow.net/questions/114948/homology-of-classifying-space-of-spin-group-bspinn/114953#114953 Answer by Somnath Basu for Homology of classifying space of spin group BSpin(n) Somnath Basu 2012-11-30T03:02:47Z 2012-11-30T03:02:47Z <p>Consider the classifying space $EG$ of a given group $G$. In your case, $G={Spin}(n)$. We have a fibration $G\to EG\to BG$ where $EG$ is contractible and $G$ acts freely on it. Therefore, the long exact sequence in homotopy groups tells you that $\pi_j(BG)\cong \pi_{j-1}(G)$. But $G={Spin}(n)$ is a Lie group which is simply connected. It is also classically known that $\pi_2(G)=0$ for finite dimensional Lie groups $G$. And, we also know that $\pi_3({Spin}(n))=\mathbb{Z}$. This implies that $\pi_j(B {Spin}(n))=0$ for $j=0,1,2,3$. Moreover, $\pi_4(B {Spin}(n))\cong H_4(B{Spin}(n);\mathbb{Z})$ by Hurewicz theorem. This is also isomorphic to $\pi_3({Spin}(n))$. The universal coefficient theorem now tells you that $H^4(B{Spin}(n);\mathbb{Z})=\mathbb{Z}$.</p>