zeroman Messages 1 Reaction score 0 Thread starter Oct 22, 2010 #1 The string theory is believed to take the form of a Calabi–Yau manifold. But the exact shape is not yet known. Is there any possibility that Lorenz attractor equations can define its shape?
The string theory is believed to take the form of a Calabi–Yau manifold. But the exact shape is not yet known. Is there any possibility that Lorenz attractor equations can define its shape?
Demystifier Science Advisor Insights Author Messages 14,771 Reaction score 7,403 Oct 22, 2010 #2 Is there any reason to conjecture that it could?
humanino Messages 2,538 Reaction score 8 Oct 22, 2010 #3 There is one simple reason it could not : the dimensions could not match (a Calabi-Yau manifold cannot have a fractal dimension).
There is one simple reason it could not : the dimensions could not match (a Calabi-Yau manifold cannot have a fractal dimension).