02:42
@VinothkumarRaman - I know what the definition of a reflective subcategory is and I know the theorem you're referring to in ACC. Above I was referring to what the definition says regarding two objects that are in the subcategory in question.
@VinothkumarRaman - It is NOT the case in general that $id_X$ will be a reflector, though.
If $id_X$ is a reflector, then $X$ is already in $A$, and any morphism $f:X\to Y$, with $Y$ also in $A$, will factor uniquely as $f=g\circ id_X$ for some $g$ in $A$.
but $g=f$ so $f$ was already in $A$. I.e. any morphism from $X$ to $Y$ is in $A$, for any $Y$ in $A$.
Conversely, if $A$ is full and $X$ is in $A$, then $id_X$ it's obvious that $id_X$ satisfies the property required of a reflector.
So the contrapositive of the first direction above is that if there is any morphism $X\to Y$ that is not in $A$, then $id_X$ is not a reflector.
Even though it is in $A$ if $X$ is.
Another way to put this is if $X\in A$ and $\eta:X\to X$ is the reflector, it is true that there is a unique $h:X\to X$ with $h\eta=id_X$. But all that means is that $\eta$ is a split monomorphism. It does not let you conclude that $\eta$ is in $A$, or that it's an isomorphism (which are, in fact, equivalent)
Category Theory
Category Theory