I'm trying to show that for $f:X \rightarrow Y$ local homeomorphism and surjective If $X$ is locally Euclidean so is $Y$.
From Local homeomorphism we have that there exists $V_{x}$ such that $f:V_{x} \rightarrow f(V_{x})$ where $y=f(x)$
But what If the neighbourhood $U_{x}$ from locally Euclidean is not contained in $V_{x}$?
Best Answer
Great! Then take $U_x\cap V_x$.