学术文献库

Given a strictly concave rational PL function $ϕ$ on a complete $n$-dimensional fan $Σ$, we construct an exact symplectic structure of finite volume on $(\mathbb{C}^\times)^n$ and a family of functions $H_{ϕ,ε}$ called polyhedral Hamiltonians. We prove that for each $ε$ the one-periodic orbits of $H_{ϕ,ε}$ come in families corresponding to finitely many primitive lattice points of $Σ$ and determine their topology. When $ϕ$ is negative on the rays of $Σ$, we show that the level sets of polyhedral Hamiltonians are hypersurfaces of contact type. As a byproduct, this construction provides a dynamical model for the singularities of toric varieties obtained as degenerations of Fano manifolds in any dimension via Okounkov bodies.