Constant sign solutions of two-point fourth order problems

Cabada, Alberto; Fernández-Gómez, Carlos

doi:10.1016/j.amc.2015.03.112

Cited by 4 publications

(16 citation statements)

References 15 publications

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“…Therefore, we can affirm without calculating it explicitly, that Green's function related to the operator u (4) These results have been obtained using the explicit form of Green's function in [8] and [9].…”

Section: -Ordermentioning

confidence: 68%

The eigenvalue characterization for the constant sign Green’s functions of ( k , n − k ) $(k,n-k)$ problems

Cabada

Saavedra

2016

Bound Value Probl

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This paper is devoted to the study of the sign of the Green's function related to a general linear nth-order operator, depending on a real parameter, T n [M], coupled with the (k, n -k) boundary value conditions.If the operator T n [M] is disconjugate for a givenM, we describe the interval of values on the real parameter M for which the Green's function has constant sign.One of the extremes of the interval is given by the first eigenvalue of the operatorThe other extreme is related to the minimum (maximum) of the first eigenvalues of (k -1, n -k + 1) and (k + 1, n -k -1) problems.Moreover, if n -k is even (odd) the Green's function cannot be nonpositive (nonnegative).To illustrate the applicability of the obtained results, we calculate the parameter intervals of constant sign Green's functions for particular operators. Our method avoids the necessity of calculating the expression of the Green's function.We finalize the paper by presenting a particular equation in which it is shown that the disconjugation hypothesis on operator T n [M] for a givenM cannot be eliminated.

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Section: -Ordermentioning

confidence: 68%

The eigenvalue characterization for the constant sign Green’s functions of ( k , n − k ) $(k,n-k)$ problems

Cabada

Saavedra

2016

Bound Value Probl

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“…Such result has been extended in [8] (and further in [9]) for any n-th order differential operator, coupled to the so-called (k, n − k) boundary conditions, which are defined, for 1 ≤ k ≤ n − 1, as follows: There is proved that m 4 0 is the least positive eigenvalue of operator u (4) on the space {u ∈ C 4 ([0, 1]), u(0) = u (0) = u(1) = u (1) = 0}…”

Section: Alberto Cabada and Rochdi Jebarimentioning

confidence: 99%

“…and −m 4 1 is the biggest negative eigenvalue of operator u (4) in the space {u ∈ C 4 ([0, 1]), u(0) = u (0) = u (0) = u(1) = 0}.…”

Section: Alberto Cabada and Rochdi Jebarimentioning

confidence: 99%

“…The study of fourth-order boundary value problems are useful for material mechanics because this kind of problems usually characterize the deformations of an elastic beam. They have been studied by many authors via various methods, such as Leray-Schauder continuation method, topological degree theory, shooting method, fixed point theorems on cones, critical point theory, the lower and upper solutions method or spectral theory, see for example [4,6,3,13,11,16,2] and references therein.…”

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confidence: 99%

“…In [4], it is characterized the sign of the Green's function g M related to the fourth order linear problem L M u(t) = u (4) (t) + M u(t) = σ(t), t ∈ I := [0,1] (1) u(0) = u (0) = u (0) = u(1) = 0.…”

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confidence: 99%

See 2 more Smart Citations

Multiplicity results for fourth order problems related to the theory of deformations beams

Cabada¹,

Jebari²

2020

Discrete &Amp; Continuous Dynamical Systems - B

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The main purpose of this paper is to establish the existence and multiplicity of positive solutions for a fourth-order boundary value problem with integral condition. By using a new technique of construct a positive cone, we apply the Krasnoselskii compression/expansion and Leggett-Williams fixed point theorems in cones to show our multiplicity results. Finally, a particular case is studied, and the existence of multiple solutions is proved for two different particular functions.

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Existence results for a clamped beam equation with integral boundary conditions

Cabada¹,

Jebari²

2020

Electron. J. Qual. Theory Differ. Equ.

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Constant sign solutions of two-point fourth order problems

Cited by 4 publications

References 15 publications

The eigenvalue characterization for the constant sign Green’s functions of ( k , n − k ) $(k,n-k)$ problems

The eigenvalue characterization for the constant sign Green’s functions of ( k , n − k ) $(k,n-k)$ problems

Multiplicity results for fourth order problems related to the theory of deformations beams

Existence results for a clamped beam equation with integral boundary conditions

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