If an $n$-gon $P$ is isospectral to a regular $n$-gon $Q$, what could we say about the shape of the $P$. Otherwise, what could we say about $Q$? In fact, some hints or simply some ideas would be appreciated.
Clarification : I talk about the spectrum of the Laplacian on the interior of the polygon, acting on the space of functions vanishing on the boundary.
Rowlett is hosting The Sound of Symmetry here. The proof of Theorem 4 is exactly as Noam Elkies suggests: Via the Dirichlet heat trace's asymptotic expansion, both area and perimeter are determined by the spectrum, and so for any $n$-gon $\Omega$ the isoperimetric ratio $|\Omega|/|\partial\Omega|^2$ is determined by the spectrum. The content of the proof is that this ratio is globally maximized among $n$-gons at the regular $n$-gon. This determines the regular $n$-gon and implies that any $n$-gon isospectral to the regular $n$-gon is in fact isometric to it. Unless there's a point in the proof where you're confused, I think this settles the question.
(I have a suspicion that the third coefficient of the heat trace in convex polygons $$ \frac{1}{24}\sum_{\mbox{angles }\alpha_i} \bigg(\frac{\pi}{\alpha_i} - \frac{\alpha_i}{\pi}\bigg) $$ is also extremal at the regular $n$-gon. This may be another way to show a version of the desired result for convex $n$-gons.)
