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On the existence of solutions for some nondegenerate nonlinear wave equations of Kirchhoff type

Jong Yeoul ParkJeong Ja Bae — 2002

Czechoslovak Mathematical Journal

Let Ω be a bounded domain in n with a smooth boundary Γ . In this work we study the existence of solutions for the following boundary value problem: 2 y t 2 - M Ω | y | 2 d x Δ y - t Δ y = f ( y ) in Q = Ω × ( 0 , ) , . 1 y = 0 in Σ 1 = Γ 1 × ( 0 , ) , M Ω | y | 2 d x y ν + t y ν = g in Σ 0 = Γ 0 × ( 0 , ) , y ( 0 ) = y 0 , y t ( 0 ) = y 1 in Ω , ( 1 ) where M is a C 1 -function such that M ( λ ) λ 0 > 0 for every λ 0 and f ( y ) = | y | α y for α 0 .

On solutions of quasilinear wave equations with nonlinear damping terms

Jong Yeoul ParkJeong Ja Bae — 2000

Czechoslovak Mathematical Journal

In this paper we consider the existence and asymptotic behavior of solutions of the following problem: u t t ( t , x ) - ( α + β u ( t , x ) 2 2 + β v ( t , x ) 2 2 ) Δ u ( t , x ) + δ | u t ( t , x ) | p - 1 u t ( t , x ) = μ | u ( t , x ) | q - 1 u ( t , x ) , x Ω , t 0 , v t t ( t , x ) - ( α + β u ( t , x ) 2 2 + β v ( t , x ) 2 2 ) Δ v ( t , x ) + δ | v t ( t , x ) | p - 1 v t ( t , x ) = μ | v ( t , x ) | q - 1 v ( t , x ) , x Ω , t 0 , u ( 0 , x ) = u 0 ( x ) , u t ( 0 , x ) = u 1 ( x ) , x Ω , v ( 0 , x ) = v 0 ( x ) , v t ( 0 , x ) = v 1 ( x ) , x Ω , u | Ω = v | Ω = 0 where q > 1 , p 1 , δ > 0 , α > 0 , β 0 , μ and Δ is the Laplacian in N .

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