Are there (known) examples of non-isometric Riemannian metrics on the projective plane that have the same length spectrum ?

This question is related to MO questions Length spectrum and Zoll surfaces of revolution and Length spectrum of spheres . In those questions Zoll surfaces on the sphere appear as counterexamples of the analogous question on $S^2$ (and spoil all the fun), so maybe one should concentrate on the projective plane where the only Zoll Riemannian metric is the the canonical metric.

Remark. Notice that there are tons of very nice reversible Finsler Zoll metrics on the sphere. Indeed, here is the Busemann recipe to cook up to smooth reversible Finsler metric on $S^2$ such that all geodesics are great circles :

1. Take a smooth strictly positive measure on the sphere that is invariant under the antipodal map.
2. If $x$ and $y$ are non-antipodal points on the unit sphere in $\mathbb{R}^3$, let $X$ and $Y$ denote the great circles obtained by intersecting the sphere with the planes orthogonal to $x$ and $y$.
3. The union of $X$ and $Y$ cuts the sphere into four connected components.
4. Define the distance between $x$ and $y$ as the measure of the smallest of these components.
5. Voilà, you have a metric. It is easy to see that great circles are geodesics and not too hard to see that it is Finsler.