True or false, if true, prove if false provide counterexample.
If $X \times Y$ is homeomorphic to $Z \times Y$ (in the product topology) then $X$ is homeomorphic to $Z$.
Need help. I've been stuck on this for awhile. I think it's true but I can't prove it...
Let $X = \{0\}$, $Y = Z = \mathbb{N}$ each with discrete topology. Then we only have to see that there is a bijection between $X \times Y$ and $Z \times Y$ but there is no bijection between $X$ and $Z$. But this should be known.
You can generate a whole family of examples in the following way. Let $X$ be any space that is not homeomorphic to $X^{\Bbb N}$; familiar nice examples include $\{0,1\}$ with the discrete topology, $[0,1]$, $\Bbb Z$, and $\Bbb R$. Let $Y=Z=X^{\Bbb N}$. Then
$$X\times Y\cong X^{\Bbb N}\cong X^{\Bbb N\times\Bbb N}\cong Z\times Y\;,$$
but $X\not\cong Z$.
