Poincaré complex

In mathematics, and especially topology, a Poincaré complex (named after the mathematician Henri Poincaré) is an abstraction of the singular chain complex of a closed, orientable manifold. The singular homology and cohomology groups of a closed, orientable manifold are related by Poincaré duality. Poincaré duality is an isomorphism between homology and cohomology groups. A chain complex is called a Poincaré complex if its homology groups and cohomology groups have the abstract properties of Poincaré duality.^[1]

A Poincaré space is a topological space whose singular chain complex is a Poincaré complex. These are used in surgery theory to analyze manifold algebraically.

Let ${\displaystyle C=\{C_i\}}$ be a chain complex of abelian groups, and assume that the homology groups of ${\displaystyle C}$ are finitely generated. Assume that there exists a map ${\displaystyle \mathrm{\Delta }:C\to C\otimes C}$, called a chain-diagonal, with the property that ${\displaystyle (\epsilon \otimes 1)\mathrm{\Delta }=(1\otimes \epsilon )\mathrm{\Delta }}$. Here the map ${\displaystyle \epsilon :C_0\to \mathbb{\mathbb{Z}}}$ denotes the ring homomorphism known as the augmentation map, which is defined as follows: if ${\displaystyle n_1{\sigma }_1+\cdots +n_k{\sigma }_k\in C_0}$, then ${\displaystyle \epsilon (n_1{\sigma }_1+\cdots +n_k{\sigma }_k)=n_1+\cdots +n_k\in \mathbb{\mathbb{Z}}}$.^[2]

Using the diagonal as defined above, we are able to form pairings, namely:

${\displaystyle \rho :H^k(C)\otimes H_n(C)\to H_{n-k}(C),\text{where}\rho (x\otimes y)=x⌢y}$,

where ${\displaystyle ⌢}$ denotes the cap product.^[3]

A chain complex C is called geometric if a chain-homotopy exists between ${\displaystyle \mathrm{\Delta }}$ and ${\displaystyle \tau \mathrm{\Delta }}$, where ${\displaystyle \tau :C\otimes C\to C\otimes C}$ is the transposition/flip given by ${\displaystyle \tau (a\otimes b)=b\otimes a}$.

A geometric chain complex is called an algebraic Poincaré complex, of dimension n, if there exists an infinite-ordered element of the n-dimensional homology group, say ${\displaystyle \mu \in H_n(C)}$, such that the maps given by

${\displaystyle (⌢\mu ):H^k(C)\to H_{n-k}(C)}$

are group isomorphisms for all ${\displaystyle 0\le k\le n}$. These isomorphisms are the isomorphisms of Poincaré duality.^[4][5]

• The singular chain complex of an orientable, closed n-dimensional manifold ${\displaystyle M}$ is an example of a Poincaré complex, where the duality isomorphisms are given by capping with the fundamental class ${\displaystyle [M]\in H_n(M;\mathbb{\mathbb{Z}})}$.^[1]

• Poincaré space

• Classifying Poincaré complexes via fundamental triples on the Manifold Atlas

0.00 (0 votes) Original source: https://en.wikipedia.org/wiki/Poincaré complex. Read more