On 2D Inverse Problems/Triangulations of surfaces

Let G be a graph embedded to a surface such that all faces of G are triangular. Such an embedding is called triangulation.



Exercise (***). Generalize the examples to prove that the spectra of G* and M(G) are equal, except possibly the eigenvalue {6}.



\sigma(G^*)\backslash \{6\}=\sigma(M(G))\backslash \{6\} $$