Zoll magnetic structures and ruled surfaces

Abstract

A Zoll magnetic system on an oriented closed surface M is a Riemannian metric g together with a function λ M R, such that every unit speed solution of the ODE γ(t)=λ(γ(t))γ(t) is periodic and the minimal period depends continuously on γ. The trivial example is given by g with constant curvature K and λ const. such that λ2+K>0. This article exhibits non-trivial Zoll magnetic systems for every genus-for genus 2 these are the first such examples. The approach is twistor theoretic: To a general magnetic system (g,λ) one associates its transport twistor space Z(g,λ), which is the unit disk bundle DM, equipped with a degenerate complex structure that encodes the magnetic flow. For the trivial Zoll magnetic systems explicit holomorphic blow-down maps β Z(g,λ) W into certain ruled surfaces W M are constructed, mapping ∂ Z(g,λ) onto a Lagrangian P⊂ W. For small Lagrangian perturbations P'≈ P the procedure can be reversed and this results in a large class of (non-trivial) nearby Zoll magnetic systems.