Here is the fractal of the fifth example, but
modified so each piece is scaled by r = 1/4. To emphasize the scaling, each piece is surrounded
by the unit square, scaled by r = 1/4. |
What is the similarity dimension of this fractal? Applying the
formula ds = Log(N)/Log(1/r), we obtain |
ds = Log(4)/Log(4) = 1. |
This is the dimension of a line, yet this fractal doesn't
look at all like a line. |
However, note the formula for ds does
not depend on the placement of the pieces, only on their number and size. |
So suppose
we move some of the pieces (without introducing any overlaps). |
Can appropriate
repositioning of the pieces make this dimension calculation match our intuitions?
Let us see. |
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Click the picture to animate. |
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