The Hessian of elliptic curves

We prove that the Hessian transformation of a plane projective cubic corresponds to a $3$-endomorphism of a model elliptic curve. By exploiting this result, we investigate a family of functional graphs -- called Hessian graphs -- defined by the Hessian transformation. We show that, over arbitrary fields of characteristics different from $2$ and $3$, the Hessian graphs inherit distinctive features from the arithmetic of the model curve. We then specialize our analysis to the finite-field case, proving several regularities of Hessian graphs.