Non-orientable 3-manifold has infinite fundamental group

algebraic-topology

Solution 1:

$\def\QQ{\mathbb Q}$If $\pi_1(M)$ is finite, $H_1(M;\QQ)=0$. If $M$ is non-orientable, $H_3(M;\QQ)=0$. So $\chi(M)=h_0(M;\QQ)-h_1(M;\QQ)+h_2(M;\QQ)-h_3(M;\QQ)=1+h_2(M;\QQ)>0$.

But by Poincaré duality, any odd-dimensional manifold has zero Euler characteristic.

Related

How do we calculate factorials for numbers with decimal places? [duplicate]
What is meaning of strict weak ordering in layman's term? [closed]
Intuitive explanation of proof of Abel's limit theorem
Automorphism group of direct product of groups
Expected value of the smallest eigenvalue
Slick proofs that if $\sum\limits_{k=1}^\infty \frac{a_k}{k}$ converges then $\lim\limits_{n\to\infty} \frac{1}{n}\sum\limits_{k=1}^n a_k=0$
What is a form?
Integral $\int_0^\frac{\pi}{2} x^2\sqrt{\tan x}\,\mathrm dx$
Shutdown hangs on "A stop job is running to for Mysql Community Server"
Is there a schematic overview of Ubuntu's architecture?
How to comply with this guideline for submitting an application to the Software Center?
Unity Web Player for Ubuntu?