Regularity and scattering for the wave equation with a critical nonlinear damping

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Küçük Resim

Tarih

2009

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Erişim Hakkı

info:eu-repo/semantics/openAccess

Özet

We show that the nonlinear wave equation u + u 3 t = 0 is globally well-posed in radially symmetric Sobolev spaces H k rad(R 3) × H k-1 rad for all integers k > 2. This partially extends the well-posedness in H k(R 3) × H k-1(.R 3) for all k ? [1,2], established by Lions and Strauss [12]. As a consequence we obtain the global existence of C? solutions with radial C? 0 data. The regularity problem requires smoothing and non-concentration estimates in addition to standard energy estimates, since the cubic damping is critical when k = 2. We also establish scattering results for initial data (u,u t)| t=0 in radially symmetric Sobolev spaces. © 2009 The Mathematical Society of Japan.

Açıklama

Anahtar Kelimeler

Nonlinear Damping, Regularity, Wave Equation

Kaynak

Journal of the Mathematical Society of Japan

WoS Q Değeri

Scopus Q Değeri

Q1

Cilt

61

Sayı

2

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