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    STUDIA MATHEMATICA - Issue no. 2 / 2021  
         
  Article:   GRAPH-DIRECTED RANDOM FRACTAL INTERPOLATION FUNCTION.

Authors:  ILDIKÓ SOMOGYI, ANNA SOÓS.
 
       
         
  Abstract:  
DOI: 10.24193/subbmath.2021.2.01

Published Online: 2021-06-15
Published Print: 2021-06-30
pp. 247-255

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Barnsley introduced in [1] the notion of fractal interpolation function (FIF). He said that a fractal function is a (FIF) if it possess some interpolation properties. It has the advantage that it can be also combined with the classical methods or real data interpolation. Hutchinson and Rüschendorf [7] gave the stochastic version of fractal interpolation function. In order to obtain fractal interpolation functions with more exibility, Wang and Yu [9] used instead of a constant scaling parameter a variable vertical scaling factor. Also the notion of fractal interpolation can be generalized to the graph-directed case introduced by Deniz and Özdemir in [5]. In this paper we study the case of a stochastic fractal interpolation function with graph-directed fractal function.

Mathematics Subject Classification (2010): 28A80, 60G18.

Keywords: Fractal interpolation function, iterated function system, random fractal interpolation function.
 
         
     
         
         
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