Hopefully, not talking out of my hat, but the difference between the final states of a double pendulum can be typed:
Somewhere in the middle of the pendulum’s journey through space and time. I’ve seen this visually and true there’s divergence. This divergence is based on measurement of the pendulum’s position in space at a given time. So with initial state A, the pendulum at time Tn was at position P1 while beginning with initial stateB(|A−B|≈0), the pendulum at time Tn was at position P2. The alleged divergence is the difference |P1−P2|, oui? Take in absolute terms, |P1−P2|=106, but logarithmically, log|P1−P2|=only 6.
At the very end when the pendulum comes to rest. There’s no divergence there, oui?
Hopefully, not talking out of my hat, but the difference between the final states of a double pendulum can be typed:
Somewhere in the middle of the pendulum’s journey through space and time. I’ve seen this visually and true there’s divergence. This divergence is based on measurement of the pendulum’s position in space at a given time. So with initial state A, the pendulum at time Tn was at position P1 while beginning with initial stateB(|A−B|≈0), the pendulum at time Tn was at position P2. The alleged divergence is the difference |P1−P2|, oui? Take in absolute terms, |P1−P2|=106, but logarithmically, log|P1−P2|=only 6.
At the very end when the pendulum comes to rest. There’s no divergence there, oui?