(all morphism here means birational) (the ground field is "small", but I don't think it should matter) Here is the picture. I have a morphism $f:\mathbb{P}^{1}\rightarrow\mathbb{P}^{1}$. I want to lift this up to a morphism $\tilde{f}:C\rightarrow E$ where $C$ is a curve and $E$ is an elliptic curve with projection $\pi_{C}:C\rightarrow\mathbb{P}^{1}$ and $\pi_{E}:C\rightarrow\mathbb{P}^{1}$. Now, most of these are not fixed. A few things are fixed: the degree of $\pi_{C}$ is fixed at some numbers $d$ independent of $f$, the degree of $\pi_{E}$ is fixed at 2, but other than that $C,E,\pi_{C},\pi{E},\tilde{f}$ we are allowed to freely choose dependent on $f$. So my actual question is: is there any $d$ in which this lifting can be done "often", in the sense that it is non-special, ie. failure to lift is not a generic property? Or is this just always false? I previously tried this for $d=2$, $C$ being (another) elliptic curve, and $\pi_{C}$ be the x-coordinate, but this gives a strong restriction on $f$, that is ramification points of $f$ must lift to $2n$-torsion points on $C$, and thus knowing $2$ points gives us at most $4n^{2}$ possible elliptic curves.