0 a complicated pattern in mathematics built from simple repeated shapes that are reduced in size every time they are repeated:
The reason we apply a uniform random number for rendering fractal is that it can create unique and more diverse forms.
The rendered environments are very realistic, often using fractal techniques to construct them.
The scaling for both jets and wakes extends over the entire range available; the average fractal dimension is 2.35k0.04 for both flows.
The notion of the nature of the stochastic layer corresponding to percolation (fractal) streamline is the foundation of percolation models.
A low-power spectrum is observed, suggesting that the structure shows a fractal nature that has no special scales.
One of the basic questions about the fractal regime of growth is that structures of all sizes are constantly generated by the instability.
Finally, the most widely investigated geometry for fractal growth is the axisymmetric configuration.
In a nutshell, fractals provide a metaphor to show global 0 local links.