Introduction to fractal dimension

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dc.contributor.author Aburamyah, Ghder
dc.date.accessioned 2018-11-16T15:59:03Z
dc.date.available 2018-11-16T15:59:03Z
dc.date.issued 2018-12-01
dc.identifier.uri http://hdl.handle.net/2097/39312
dc.description.abstract When studying geometrical objects less regular than ordinary ones, fractal analysis becomes a valuable tool. Over the last 40 years, this small branch of mathematics has developed extensively. Fractals can be defined as those sets which have non-integer Hausdorff or Minkowski dimension. In this report, we introduce certain definitions of fractal dimensions, which can be used to measure a set’s fractal degree. We introduce Minkowski dimension and Hausdorff dimension and explore some examples where they coincide, as well as other examples where they do not. en_US
dc.description.sponsorship SACM en_US
dc.language.iso en_US en_US
dc.subject FractalDimension en_US
dc.subject Fractaldimension en_US
dc.subject Fractal en_US
dc.subject Dimension en_US
dc.subject Hausdorff dimension en_US
dc.subject Minkowski dimension en_US
dc.title Introduction to fractal dimension en_US
dc.type Report en_US
dc.description.degree Master of Science en_US
dc.description.level Masters en_US
dc.description.department Department of Mathematics en_US
dc.description.advisor Hrant Hakobyan en_US
dc.date.published 2018 en_US
dc.date.graduationmonth December en_US


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