Morse index, topological degree and local uniqueness of multi-spikes solutions to the Lane-Emden problem in dimension two
Abstract
We consider multi-spike positive solutions to the Lane-Emden problem in any bounded smooth planar domain and compute their Morse index, extending to the dimension N=2 classical theorems due to Bahri-Li-Rey (1995) and Rey (1999) when N≥ 4 and N=3, respectively. Furthermore, by deeply investigating their concentration behavior, we also derive the total topological degree. The Morse index and the degree counting formula yield a new local uniqueness result.
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