Let $A\in \mathcal{M}_{m\times m}(\mathbb R)$ , $det(A)=1$ , $A$ is positively definite. Which matrices $P$ satisfy the equation $$P^TAP=A$$ In fact I am interested in sequences of traces $tr P^n$ of the iterations of such solutions.
In dimension $2$ one can show that $$P^n=\left( \begin{array}{cc} \cos n\phi& -\beta \sin n\phi \\ \alpha \sin n\phi & \cos n\phi\\ \end{array}\right)$$ for some $\phi, \alpha, \beta$ satisfying$\alpha\beta=1$ hence $tr P^n= 2\cos n\phi$.
As $A=L^\top L$, for some $L\in M_{m\times m}(\mathbb{R})$, $\det L=1$, you can rewrite $P^\top L^\top LP=L^\top L$ and then multiply both sides by $L^{-1}$, etc., obtaining $(L^{\top})^{-1}P^\top L^\top LPL^{-1}=(LPL^{-1})^\top LPL^{-1}=I$, i.e. each $LPL^{-1}$ must be orthogonal.
As traces are preserved under conjugation, you can assume $L=I$, and so your question is reduced to studying traces of orthogonal matrices. The trace is the sum of eigenvalues, which are all modulus 1 complex numbers for orthogonal matrices.
Using the vec operator, any matrix $X$ such that $vec A$ is an eigenvector of $(X\otimes X)^T$ corresponding to the eigenvalue $1$ would work.
