Bifurcation results for periodic third-order Ambrosetti-Prodi-type problems

dc.contributor.authorMinhós, Feliz
dc.contributor.authorOliveira, Nuno
dc.contributor.editorGoodrich, Chris
dc.date.accessioned2022-12-28T15:24:10Z
dc.date.available2022-12-28T15:24:10Z
dc.date.issued2022-08-07
dc.description.abstractThis paper presents sufficient conditions for the existence of a bifurcation point for nonlinear periodic third-order fully differential equations. In short, the main discussion on the parameter s about the existence, non-existence, or the multiplicity of solutions, states that there are some critical numbers σ0 and σ1 such that the problem has no solution, at least one or at least two solutions if s<σ0, s=σ0 or σ0>s>σ1, respectively, or with reversed inequalities. The main tool is the different speed of variation between the variables, together with a new type of (strict) lower and upper solutions, not necessarily ordered. The arguments are based in the Leray–Schauder’s topological degree theory. An example suggests a technique to estimate for the critical values σ0 and σ1 of the parameter.por
dc.identifier.authoremailfminhos@uevora.pt
dc.identifier.authoremailnmgo@sapo.pt
dc.identifier.citationMinhós F, Oliveira N. Bifurcation Results for Periodic Third-Order Ambrosetti-Prodi-Type Problems. Axioms. 2022; 11(8):387. https://doi.org/10.3390/axioms11080387por
dc.identifier.doihttps://doi.org/10.3390/axioms11080387por
dc.identifier.issn2075-1680
dc.identifier.revistaAxioms
dc.identifier.scientificarea334por
dc.identifier.sharewithMATpor
dc.identifier.urihttps://doi.org/10.3390/axioms11080387
dc.identifier.urihttp://hdl.handle.net/10174/32925
dc.identifier.volume11 (8)
dc.language.isoengpor
dc.peerreviewedyespor
dc.publisherMDPIpor
dc.rightsopenAccesspor
dc.subjecthigher-order periodic problemspor
dc.subjectlower and upper solutionspor
dc.subjectNagumo conditionpor
dc.subjectdegree theorypor
dc.titleBifurcation results for periodic third-order Ambrosetti-Prodi-type problemspor
dc.typearticlepor

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