# ambitoric

We use the methods of \cite{ambitoric2} to show that on a compact symplectic toric ${\displaystyle 4}$-orbifold with second Betti number equal to ${\displaystyle 2}$, ${\displaystyle K}$-polystability is also a sufficient condition for the existence of (toric) conformally K\"ahler, EM metrics, and the latter are explicitly described as ambitoric in the sense of \cite{ambitoric1}.