Homology of compact non-orientable surfaces

This article describes the value (and the process used to compute it) of some homotopy invariant(s) for a topological space or family of topological spaces. The invariant is homology and the topological space/family is compact non-orientable surface
Get more specific information about compact non-orientable surface | Get more computations of homology

Statement

Suppose $k$ is a positive integer. We denote by $P_{n}$ (not standard notation, should try to find something) the connected sum of the real projective plane with itself $n$ times, i.e., the connected sum of $n$ copies of the real projective plane.

Unreduced version over the integers

We have:

$H_{k} (P_{n}; Z) = {\begin{matrix} Z, & k = 0 \\ Z^{n - 1} \oplus Z / 2 Z, & k = 1 \\ 0, & k \geq 2 \end{matrix}$

Reduced version over the integers

We have:

${\tilde{H}}_{k} (P_{n}; Z) = {\begin{matrix} 0, & k = 0 \\ Z^{n - 1} \oplus Z / 2 Z, & k = 1 \\ 0, & k \geq 2 \end{matrix}$

Unreduced version over a module

If we consider the homology with coefficients in a module $M$ over a ring $R$ where 2 is invertible, then we have:

$H_{k} (P_{n}; M) = {\begin{matrix} M, & k = 0 \\ M^{n - 1}, & k = 1 \\ 0, & k \geq 2 \end{matrix}$

Related invariants

These are all invariants that can be computed in terms of the homology groups.

Invariant	General description	Description of value for connected sum of $n$ copies of real projective plane	Comment
Betti numbers	The $k^{t h}$ Betti number $b_{k}$ is the rank of the $k^{t h}$ homology group.	$b_{0} = 1$ , $b_{1} = n - 1$ , all higher $b_{k}$ are zero
Poincare polynomial	Generating polynomial for Betti numbers	$1 + (n - 1) x$
Euler characteristic	$\sum_{k = 0}^{\infty} (- 1)^{k} b_{k}$	$2 - n$	In particular, this means that the Euler characteristic is negative for $n > 2$ . Note that if the Euler characteristic of a compact surface is odd and at most $1$ , then the surface must be non-orientable and its homeomorphism type can be computed (using $2 - n = χ$ . If the Euler characteristic is even and at most $0$ , then there is a unique possibility for a compact orientable surface and a unique possibility for a compact non-orientable surface. For an Euler characteristic of $2$ , there is a unique compact orientable surface and no compact non-orientable surface. For an Euler characteristic bigger than $2$ , there is no (connected) compact surface possible.