I'm studying the book Topology, Geometry, and Gauge Fields by Gregory L Naber. This is for self study.
I'm trying to prove the first part of Lemma 1.1.2
Let $Y$ be a subspace of $Y'$. If $f:X \to Y'$ is a continuous map with $f(X) \subseteq Y$, then, regarded as a map into $Y$, $f:X \to Y$ is continuous.
My attempt is as follows:
To show that $f:X \to Y$ is continuous we need to show that if $U$ is open in $Y$ then $f^{-1}(U)$ is open in $X$. We know that $f:X \to Y'$ is continuous, so for any open set $U'$ of $Y'$ it follows that $f^{-1}(U')$ is open in $X$. Note since $Y$ is a subspace of $Y'$ then it has the relative topology $T = \{ Y \cap U' : U' \in T'\}$, where T' is the topology of $Y'$. So if $U$ is open in $Y$ then $U = Y \cap U'$ for some open subset $U'$ of $Y'$.
So now we have $f^{-1}(U) = f^{-1}(Y \cap U')$ and it is at this point where I'm having trouble moving forward. If this function were injective then I could simply write $f^{-1}(Y \cap U') = f^{-1}(Y) \cap f^{-1}(U') = X \cap f^{-1}(U')$ which is open. But I'm not given that it is injective so somehow I need to use the fact that $f(X) \subseteq Y$. I feel like I need to concentrate on $f^{-1}(Y \cap U')$ in conjunction with $f(X) \subseteq Y$.
Am I on the right track here? I'm just not sure of how to move forward. Thanks
