Cellular decomposition: Difference between revisions

In geometric topology, a cellular decomposition G of a manifold M is a decomposition of M as the disjoint union of cells (spaces homeomorphic to n-balls Bⁿ).

The quotient space M/G has points that correspond to the cells of the decomposition. There is a natural map from M to M/G, which is given the quotient topology. A fundamental question is whether M is homeomorphic to M/G. Bing's dogbone space is an example with M (equal to R³) not homeomorphic to M/G.

Cellular decomposition of ${\displaystyle X}$ is an open cover ${\displaystyle ℰ}$ with a function ${\displaystyle \text{deg}:ℰ\to \mathbb{Z}}$ for which:

• Cells are disjoint: for any distinct ${\displaystyle e,e^{\prime }\in ℰ}$, ${\displaystyle e\cap e^{\prime }=\varnothing }$.
• No set gets mapped to a negative number: ${\displaystyle {\text{deg}}^{-1}(\{j\in \mathbb{Z}\mid j\le -1\})=\varnothing }$.
• Cells look like balls: For any ${\displaystyle n\in {\mathbb{N}}_0}$ and for any ${\displaystyle e\in {\mathrm{deg}}^{-1}(n)}$ there exists a continuous map ${\displaystyle \varphi :B^n\to X}$ that is an isomorphism ${\displaystyle \text{int}{B}^n\cong e}$ and also ${\displaystyle \varphi (\partial B^n)\subseteq \cup {\text{deg}}^{-1}(n-1)}$.

A cell complex is a pair ${\displaystyle (X,ℰ)}$ where ${\displaystyle X}$ is a topological space and ${\displaystyle ℰ}$ is a cellular decomposition of ${\displaystyle X}$.

• CW complex

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