When are there solutions to $f(x+y)-f(x-y) = axy+bx+cy+d $ and what are they?

Question

This is a generalization of

Solving the functional equation

When are there solutions to $f(x+y)-f(x-y) = axy+bx+cy+d $ (i.e., what restrictions are there on $a, b, c, d$) and what are they?

I have a solution, but want to see what others come up with.

Answer 1

An immediate observation taking $x=y=0$ is that $d$ must be $0$.

Next, with $y=0$, we find that $0=f(x)-f(x)=bx$ for all $x$, so that $b$ too must be $0$.

At this point, one may repeat DHMO's solution in the linked question to find that solutions do exist and are of the form

$$f(z)=\frac{a}4z^2+\frac{c}{2}z+f(0)$$