Limiting behavior of a class of Hermitian Yang-Mills metrics, II: exponential decay
Abstract
In this note, the geometric set-up, the rank two bundle, the local HYM ansatz, and the global gluing construction are the same as in the preceding work Fu. The new point is an exponential estimate for the radial ordinary differential equation obtained near each branch point. If uε denotes the local radial solution and 12 r the singular limiting solution, then for every integer k0, there exist positive constants Ck and ck such that \[ \| uε- 12 r \|Ck([r0,2r0]) Ck e-ck/ε. \] Consequently, all results of the preceding paper can be refined.
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