Iterative methods for a fractional-order Volterra population model

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dc.contributor.authorRoy, R.
dc.contributor.authorVijesh, V.A.
dc.contributor.authorGodavarma, G.
dc.date.accessioned2026-02-05T09:30:30Z
dc.date.issued2019
dc.description.abstractWe prove an existence and uniqueness theorem for a fractional-order Volterra population model via an efficient monotone iterative scheme. By coupling a spectral method with the proposed iterative scheme, the fractional-order integrodiffer- ential equation is solved numerically. The numerical experiments show that the proposed iterative scheme is more efficient than an existing iterative scheme in the literature, the convergence of which is very sensitive to various parameters, including the fractional order of the derivative. The spectral method based on our proposed iterative scheme shows greater flexibility with respect to various parameters. Sufficient conditions are provided to select the initial guess that ensures the quadratic convergence of the quasilinearization scheme. © 2019 Rocky Mountain Mathematics Consortium.
dc.identifier.citationJournal of Integral Equations and Applications, 2019, 31, 2, pp. 245-264
dc.identifier.issn8973962
dc.identifier.urihttps://doi.org/10.1216/JIE-2019-31-2-245
dc.identifier.urihttps://idr.nitk.ac.in/handle/123456789/24762
dc.publisherRocky Mountain Mathematics Consortium PO Box 871804 Tempe AZ 85287-1804
dc.subjectCaputo's fractional derivative
dc.subjectMonotone iterative tech- nique
dc.subjectQuasilinearization
dc.subjectSpectral collocation method
dc.subjectVolterra population model
dc.titleIterative methods for a fractional-order Volterra population model

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