Least Energy Solutions of Semilinear Neumann Problems and Asymptotics
Author(s)
Pan, Xing-Bin
Xu, Xingwang
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Abstract
The asymptotic behavior of the least energy solutions of the semilinear Neumann problems involving critical Sobolev exponent on a bounded domain in R^4 is studied. The effect of the geometry of the boundary and the critical index contained in the boundary conditions on the existence and the asymptotic behavior of the solutions is our main concern.
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Date
1994
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Text
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Pre-print