Please use this identifier to cite or link to this item: http://repositorio.ufla.br/jspui/handle/1/55274
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dc.creatorSalgado, Silvio Antonio Bueno-
dc.creatorRojas, Onofre-
dc.creatorSouza, Sérgio Martins de-
dc.creatorPires, Danilo Machado-
dc.creatorFerreira, Leandro-
dc.date.accessioned2022-10-07T16:54:48Z-
dc.date.available2022-10-07T16:54:48Z-
dc.date.issued2022-01-08-
dc.identifier.citationSALGADO, S. A. B. et al. Modeling the linear drag on falling balls via interactive fuzzy initial value problem. Computational and Applied Mathematics, [S.l.], v. 41, 2022. DOI: 10.1007/s40314-021-01736-8.pt_BR
dc.identifier.urihttps://link.springer.com/article/10.1007/s40314-021-01736-8pt_BR
dc.identifier.urihttp://repositorio.ufla.br/jspui/handle/1/55274-
dc.description.abstractIn this paper, we consider the linear drag of a falling ball, which can be well described using an interactive fuzzy initial value problem. The solution of the interactive fuzzy initial value problem gives us two types of solutions. One solution is when the uncertainty increases as time evolves, that is to say when the diameter of the fuzzy velocity increases exponentially. Hence, we ignore this solution, because we cannot expect this type of behavior for a ball that drags on a specific fluid. After all, experimentally, the ball must reach a well-known terminal velocity. The other branch of solution behaves as expected, the time-dependent fuzzy velocity converges to a well-known terminal velocity; meaning that, the diameter of the fuzzy velocity converges to terminal velocity. Therefore, we explore several conditions of fuzzy initial velocity and conclude that, for any fuzzy initial velocity, the fuzzy terminal velocity always converges to the classical terminal velocity, which is well known in the literature. We also present the corresponding time-dependent fuzzy acceleration, which becomes null for a sufficiently long time.pt_BR
dc.languageen_USpt_BR
dc.publisherSpringerpt_BR
dc.rightsrestrictAccesspt_BR
dc.sourceComputational and Applied Mathematicspt_BR
dc.subjectDrag inpt_BR
dc.subjectSpherespt_BR
dc.subjectResistive mediumpt_BR
dc.subjectFuzzy differential equationpt_BR
dc.subjectInteractivitypt_BR
dc.subjectFuzzy Laplace transformpt_BR
dc.titleModeling the linear drag on falling balls via interactive fuzzy initial value problempt_BR
dc.typeArtigopt_BR
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