2019
DOI: 10.1002/mana.201700350
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Global existence, asymptotic stability and blow‐up of solutions for the generalized Boussinesq equation with nonlinear boundary condition

Abstract: In this paper, we consider initial boundary value problem of the generalized Boussinesq equation with nonlinear interior source and boundary absorptive terms.We establish firstly the local existence of solutions by standard Galerkin method. Then we prove both the global existence of the solution and a general decay of the energy functions under some restrictions on the initial data. We also prove a blow-up result for solutions with positive and negative initial energy respectively. K E Y W O R D S blow-up, dec… Show more

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Cited by 3 publications
(2 citation statements)
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“…First of all, for each m and the corresponding given function f m (x, t), according to the statement of Theorem 4 we have established the existence of a smoother (than in Theorem 3) unique solution u m (x, t) of initial boundary value problem ( 13)- (15) for the corresponding trapezoid Q m xt . We continue functions u m (x, t), f m (x, t) from the trapezoid Q m xt by zero to the entire triangle Q xt and denote them by ũm (x, t), fm (x, t).…”
Section: Proof Of the Theorem 1 Uniquenessmentioning
confidence: 88%
See 1 more Smart Citation
“…First of all, for each m and the corresponding given function f m (x, t), according to the statement of Theorem 4 we have established the existence of a smoother (than in Theorem 3) unique solution u m (x, t) of initial boundary value problem ( 13)- (15) for the corresponding trapezoid Q m xt . We continue functions u m (x, t), f m (x, t) from the trapezoid Q m xt by zero to the entire triangle Q xt and denote them by ũm (x, t), fm (x, t).…”
Section: Proof Of the Theorem 1 Uniquenessmentioning
confidence: 88%
“…First of all, for each m and the corresponding given function f m (x, t), according to the statement of Theorem 3, we have established the existence of a unique solution u m (x, t) of initial boundary value problem ( 13)- (15).…”
Section: Proof Of Theorem 1 Existencementioning
confidence: 99%