Monotone Lagrangian submanifolds of Cn and toric topology

Abstract

Mironov, Panov and Kotelskiy studied Hamiltonian-minimal Lagrangians inside Cn. They associated a closed embedded Lagrangian L to each Delzant polytope P. In this paper we develop their ideas and prove that L is monotone if and only if the polytope P is Fano. In some examples, we further compute the minimal Maslov numbers. Namely, let N Tk be some fibration over the k-dimensional torus with a fiber equal to either Sk × Sl, or Sk × Sl × Sm, or \#5(S2p-1 × Sn-2p-2). We construct monotone Lagrangian embeddings N ⊂ Cn with different minimal Maslov number, and therefore distinct up to Lagrangian isotopy. Moreover, we show that some of our embeddings are smoothly isotopic but not Lagrangian isotopic.