A geometric approach to the Mather quotient problem

Let $(M,g)$ be a closed, connected and orientable Riemannian manifold with nonnegative Ricci curvature. Consider a Lagrangian $L(x,v):TM\to\R$ defined by $L(x,v):=\frac~12g_x(v,v)-\omega(v)+c$, where $c\in\R$ and $\omega$ is a closed 1-form. From the perspective of differential geometry, we estimate the Laplacian of the weak Kolmogorov-Arnold-Moser (KAM) solution $u$ to the associated Hamilton-Jacobi equation $H(x,du)=c[L]$ in the barrier sense. This analysis enables us to prove that each weak KAM solution $u$ is a constant if and only if $\omega$ is a harmonic 1-form. Furthermore, we explore several applications to the Mather quotient and the Ma né Lagrangian.