2020
DOI: 10.1515/anona-2020-0154
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Existence, multiplicity and nonexistence results for Kirchhoff type equations

Abstract: In this paper, we study following Kirchhoff type equation: $$\begin{array}{} \left\{ \begin{array}{lll} -\left(a+b\int_{{\it\Omega}}|\nabla u|^2 \mathrm{d}x \right){\it\Delta} u=f(u)+h~~&\mbox{in}~~{\it\Omega}, \\ u=0~~&\mbox{on}~~ \partial{\it\Omega}. \end{array} \right. \end{array}$$ We consider first the case that Ω ⊂ ℝ3 is a bounded domain. Existence of at least one or two positive solutions for above equation is obtained by using the monotonicity trick. Nonexistence criterion is also established … Show more

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Cited by 21 publications
(9 citation statements)
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“…For the non-local source case, we refer to some very recent related references, e.g. [24] for the threshold results of the global existence and non-existence for the signchanging weak solutions of thin film equation; [14] and [8] for the Kirchhoff type problem with non-local source 1 |Ω| Ω |u| q−1 udx; [15] for the finite time blow-up of solutions with non-positive initial energy J(u 0 ) and non-local source 1 |Ω| Ω |u| q dx with q > 1; [18] for the well-posedness of pseudo-parabolic equation with singular potential term at three initial energy levels, the logarithmic nonlinearity in [7] and the non-local source 1 |Ω| Ω |u| q−1 udx in [30]. As far as we know, there are few research works concerned with the sign-changing solutions for the mixed pseudoparabolic Kirchhoff equation.…”
mentioning
confidence: 99%
“…For the non-local source case, we refer to some very recent related references, e.g. [24] for the threshold results of the global existence and non-existence for the signchanging weak solutions of thin film equation; [14] and [8] for the Kirchhoff type problem with non-local source 1 |Ω| Ω |u| q−1 udx; [15] for the finite time blow-up of solutions with non-positive initial energy J(u 0 ) and non-local source 1 |Ω| Ω |u| q dx with q > 1; [18] for the well-posedness of pseudo-parabolic equation with singular potential term at three initial energy levels, the logarithmic nonlinearity in [7] and the non-local source 1 |Ω| Ω |u| q−1 udx in [30]. As far as we know, there are few research works concerned with the sign-changing solutions for the mixed pseudoparabolic Kirchhoff equation.…”
mentioning
confidence: 99%
“…For all j, the solution γ h j ∈ C 2 [0, T ] of ( 21) is global and unique, which shows that there exists a unique v h satisfying (19) and solving the problem (20). By the Poincaré inequality, there holds…”
Section: The Valuementioning
confidence: 98%
“…We know that the problem ( 16)-( 18) admits a local solution by taking the limit in (20) which satisfies (34). Hence, we obtain the solution v of ( 16)- (18).…”
Section: The Valuementioning
confidence: 99%
See 1 more Smart Citation
“…For more mathematical and physical background on Kirchhoff type problems, we refer the readers to previous works. [2][3][4][5][6][7][8][9] After Lions 10 proposed an abstract functional analysis framework to Kirchhoff Equation (1.2), based on variational methods, a number of important results of the existence and multiplicity of solutions for problem (1.2) have been established when 𝑓 satisfies various conditions, here we just cite previous studies for the subcritical growth case [11][12][13][14][15][16][17][18][19][20] :…”
Section: Introductionmentioning
confidence: 99%