Bhattacharya, GS and Raghuprasad, BK (1997) Dimensional Characterization of Singular Fractal Functions. In: Chaos, Solitons and Fractals, 8 (6). pp. 901-908.
Restricted to Registered users only
Download (397Kb) | Request a copy
Construction of singular fractal functions which are monotonically increasing functions, differentiable almost everywhere and possess nearly zero derivative, is explained based on an iterative technique of distribution of mass onto a line segment, and their graphs are generated using different values of the two relevant parameters. The fractal dimension of the set of points, called the measure’s concentrate (where almost the entire mass to be distributed gradually becomes accumulated in successive generations) is found using the result of curdling. The multifractal nature of the measure’s concentrate, keeping one parameter unchanged and varying another parameter, is pointed out.
|Item Type:||Journal Article|
|Additional Information:||Copyright of this article belongs to Elsevier.|
|Department/Centre:||Division of Mechanical Sciences > Civil Engineering|
|Date Deposited:||01 Feb 2007|
|Last Modified:||19 Sep 2010 04:34|
Actions (login required)