Please use this identifier to cite or link to this item: http://hdl.handle.net/2080/4229
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dc.contributor.authorJha, Sangita-
dc.contributor.authorVerma, Saurabh-
dc.contributor.authorChand, A.K.B.-
dc.date.accessioned2024-01-04T10:33:25Z-
dc.date.available2024-01-04T10:33:25Z-
dc.date.issued2023-12-
dc.identifier.citation38th Annual Conference of Ramanujan Mathematical Society(RMS), IIT Guwahati, India, 22nd - 24th December 2023en_US
dc.identifier.urihttp://hdl.handle.net/2080/4229-
dc.descriptionCopyright belongs to proceeding publisheren_US
dc.description.abstractThe fractal interpolation functions with appropriate iterated function systems (IFSs) provide a method to perturb and approximate a continuous function on a compact interval I. This method produces a class of functions f α, named as α-fractal functions. As essential parameters of the IFS, the scaling factor α has important consequences in the properties of the function f α. In this talk, we discuss the α-fractal functions corresponding to the non-stationary zipper IFS. Here, we present a method to calculate an upper bound of the box and Hausdorff dimension of the proposed interpolant. Also, we provide an upper bound of the graph of the fractional integral of the proposed interpolanten_US
dc.subjectFractal Dimensionen_US
dc.subjectFractional Calculusen_US
dc.subjectΑ-Fractal Functionsen_US
dc.titleFractal Dimension and Fractional Calculus of Non-Stationary Zipper Α-Fractal Functionen_US
dc.typePresentationen_US
Appears in Collections:Conference Papers

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