I am giving $S^n$ the CW complex structure with $2$ $k-$cells in each dimension $0\leq k\leq n$ . The attaching maps are given by the pushout diagram.
$\require{AMScd}
\begin{CD}
S^{k-1}\cup S^{k-1} @>{i}>> D^k\cup D^k\\
@V{id\cup id}VV @VVV \\
S^{k-1} @>>> S^k
\end{CD}
$
I want to compute the...
In mathematics, cellular homology in algebraic topology is a homology theory for the category of CW-complexes. It agrees with singular homology, and can provide an effective means of computing homology modules.
== Definition ==
If
X
{\displaystyle X}
is a CW-complex with n-skeleton
X
n
{\displaystyle X_{n}}
, the cellular-homology modules are defined as the homology groups of the cellular chain complex
⋯
→
...
I have edited away the tag "cellular homology". Given that we already have "homology-cohomology" and "cw-complex", I think it already covers the subject well.
I have a question in tag differential-geometry, is that tag only focus on classical differetial geometry?
I mean the study of curves and surfaces, typical content includes curvature and frames of curves and surfaces, 1st and 2nd fundamental form of surfave, Gauss-Codazzi equation and Gauss theorem etc.
@Andrews No, definitely not. The tag is used for study in all dimensions, and include Riemannian geometry etc. If the question is about surface, one can use also the "surface" tag.
Although I guess it is possible for a tag to be too broad. My understanding is that analysis and algebra used to exist here, but have since been "fragmented" into several slightly more specific tags.
And now that I actually checked, it seems that the situations are slightly different : algebra has been black-listed, but analysis still exists but the tag-excerpt suggest using the more specific tags instead.