Boundedness of Differential of Symplectic Vortices in Open Cylinder Model

Let G be a compact connected Lie group, ( X , ω , μ ) a Hamiltonian G -manifold with moment map μ , and Z a codimension-2 Hamiltonian G -submanifold of X . We study the boundedness of the differential of symplectic vortices ( A , u ) near Z , where A is a connection 1-form of a principal G -bundle P over a punctured Riemann surface Σ ˚ , and u is a G -equivariant map from P to an open cylinder model near Z . We show that if the total energy of a family of symplectic vortices on Σ ˚ ≅ [ 0 , + ∞ ) × S 1 is finite, then the A -twisted differential d A u ( r , θ ) is uniformly bounded for all ( r , θ ) ∈ [ 0 , + ∞ ) × S 1 .