On the p-torsional rigidity of compact metric graphs: a sharp Kohler--Jobin inequality

Abstract

We investigate the p-torsional rigidity for the p-Laplacian, 1<p<∞, on compact connected metric graphs equipped with Dirichlet conditions on a nonempty set VD of degree-one vertices and nonlinear Kirchhoff conditions at all remaining vertices. We establish the existence, uniqueness, and positivity of the p-torsion function, together with a variational characterization of the p-torsional rigidity. Our main contribution is the derivation of two sharp isoperimetric inequalities. We first prove a p-Saint-Venant inequality, showing that, among all compact metric graphs of prescribed total length, the p-torsional rigidity is maximized precisely by the interval with a single Dirichlet endpoint. We then derive a sharp p-Kohler--Jobin inequality, providing a scale-invariant lower bound for the first eigenvalue of the p-Laplacian in terms of the p-torsional rigidity. These results yield nonlinear counterparts, in the setting of compact metric graphs, of the classical Saint-Venant and Kohler--Jobin inequalities, and extend the linear theory, where p=2, developed by Mugnolo and Plümer to the full range 1<p<∞.

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