For the Neumann sinh-Gordon equation on the unit ball B ⊂R^2 $-\Delta u = λ^+(e^u/\int_B e^u-1/\pi)-λ^-(e^{-u}/\int_B e^{-u}-1/\pi)$ in $B$, $∂_ν=0$ on $\partial B$ we construct sequence of solutions which exhibit a multiple blow up at the origin, where λ± are positive parameters. It answers partially an open problem formulated in Jost et al. [Calc Var Partial Diff Equ 31(2):263–276].

Esposito, P., Wei, J. (2009). Non-simple blow-up solutions for the Neumann two-dimensional sinh-Gordon equation. CALCULUS OF VARIATIONS AND PARTIAL DIFFERENTIAL EQUATIONS, 34(3), 341-375 [10.1007/s00526-008-0187-0].

Non-simple blow-up solutions for the Neumann two-dimensional sinh-Gordon equation

ESPOSITO, PIERPAOLO;
2009-01-01

Abstract

For the Neumann sinh-Gordon equation on the unit ball B ⊂R^2 $-\Delta u = λ^+(e^u/\int_B e^u-1/\pi)-λ^-(e^{-u}/\int_B e^{-u}-1/\pi)$ in $B$, $∂_ν=0$ on $\partial B$ we construct sequence of solutions which exhibit a multiple blow up at the origin, where λ± are positive parameters. It answers partially an open problem formulated in Jost et al. [Calc Var Partial Diff Equ 31(2):263–276].
2009
Esposito, P., Wei, J. (2009). Non-simple blow-up solutions for the Neumann two-dimensional sinh-Gordon equation. CALCULUS OF VARIATIONS AND PARTIAL DIFFERENTIAL EQUATIONS, 34(3), 341-375 [10.1007/s00526-008-0187-0].
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11590/117358
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