What conditions are sufficient to prove a transformation in $\mathbb{R}^2$ is affine? [closed]

Question

What conditions are sufficient to prove a transformation in $\mathbb{R}^2$ is affine?

I currently have shown that the transformation is bijective, points and lines are preserved and also the following:

If $M$, $N$, $X$, $Y$ are points such that $MN \parallel XY$ and $MN$ is parallel to one of the coordinate axes, then the images $M'$, $N'$, $X'$, $Y'$ also satisfy $M'N' \parallel X'Y'$ and $M'N'$ is parallel to one of the coordinate axes.

Do I still need to show parallel-ness in general is preserved or not?

Answer 1

By the fundamental theorem of geometry, if a transformation of $\mathbb R^d$ with $d\ge2$ is bijective and maps lines onto lines, then it is affine. The main result in AMS Proc. 1999 implies that, more generally, if a transformation of $\mathbb R^d$ with $d\ge2$ is surjective and maps lines into lines, then it is affine.

So, you don't need the condition "If $M$, $N$, $X$, $Y$ are points such that $MN \parallel XY$ ..." at all. Also, you can relax the conditions of bijectivity and preservation of lines to the conditions of surjectivity and preservation of collinearity -- and you don't need any other conditions to get the affinity.