On Complete Bicubic Fractal Splines ()
ABSTRACT
Fractal geometry provides a new insight to the approximation and modelling of experimental data. We give the construction of complete cubic fractal splines from a suitable basis and their error bounds with the original function. These univariate properties are then used to investigate complete bicubic fractal splines over a rectangle Bicubic fractal splines are invariant in all scales and they generalize classical bicubic splines. Finally, for an original function , upper bounds of the error for the complete bicubic fractal splines and derivatives are deduced. The effect of equal and non-equal scaling vectors on complete bicubic fractal splines were illustrated with suitably chosen examples.
Share and Cite:
Chand, A. and Navascués, M. (2010) On Complete Bicubic Fractal Splines.
Applied Mathematics,
1, 200-210. doi:
10.4236/am.2010.13024.