Lagrangian curves on spectral curves of monopoles

Abstract

We study Lagrangian points on smooth holomorphic curves in T P1 equipped with a natural neutral K\"ahler structure, and prove that they must form real curves. By virtue of the identification of T P1 with the space L( E3) of oriented affine lines in Euclidean 3-space E3, these Lagrangian curves give rise to ruled surfaces in E3, which we prove have zero Gauss curvature. Each ruled surface is shown to be the tangent lines to a curve in E3, called the edge of regression of the ruled surface. We give an alternative characterization of these curves as the points in E3 where the number of oriented lines in the complex curve that pass through the point is less than the degree of . We then apply these results to the spectral curves of certain monopoles and construct the ruled surfaces and edges of regression generated by the Lagrangian curves.