Translated points for contactomorphisms of prequantization spaces over monotone symplectic toric manifolds (Q2673138)

A high driving force in symplectic topology is the celebrated Arnold conjecture concerning the number of fixed points of a Hamitonian symplectomorphism. The analogue of the Arnold conjecture in contact topology was introduced by \textit{S. Sandon} [Geom. Dedicata 165, 95--110 (2013; Zbl 1287.53067)] through the notion of \textit{translated point}. The main result of the paper under review is a version of Sandon's conjecture, namely \textbf{Theorem 1.1.1.}: Let \((M, \omega,. \mathbb{T})\) be a closed monotone symplectic toric manifold with primitive symplectic form. Assume that it is different from \((\mathbb{C}P^{n-1}, \omega _{FS}, \mathbb{T}^n/S^1)\) and let \((V, \xi:=ker\ \alpha )\) be the prequantization space over \((M, \omega )\) with Euler class \(-[\omega ]\). Then any \(\phi \in \operatorname{Cont}_0(V, \xi )\) has at least \(N_M\) \(\alpha \)-translated points. The minimal Chern number \(N_M\) of a monotone symplectic toric manifold is always strictly smaller than its cuplength \(cl(M)=\dim _{\mathbb{C}}M+1\) unless \((M, \omega )=(\mathbb{C}P^{n-1}, \omega _{FS})\) when both quantities equal \(n\).