One idea how to measure the measure of simulations I had is that it is proportional of the energy of calculation. That is because the large computer could be “sliced” into two parallel if we could make slices in 4 dimensions. We could do such slices until we reach Plank level. So any simulation is equal to finite number of Plank simulation.
Base reality level computers will use more energy of calculations and any sub-level will use only part of this energy, so we have smaller measure for lower level simulations.
But it is just preliminary idea, as we need to coordinate it with probability of branches in MWI and also find the ways to prove it.
Interesting idea. So I guess that approach is focused on measure across universes with physics similar to ours? I wonder what fraction of simulations have physics similar to one level up. Presumably ancestor simulations would.
One idea how to measure the measure of simulations I had is that it is proportional of the energy of calculation. That is because the large computer could be “sliced” into two parallel if we could make slices in 4 dimensions. We could do such slices until we reach Plank level. So any simulation is equal to finite number of Plank simulation.
Base reality level computers will use more energy of calculations and any sub-level will use only part of this energy, so we have smaller measure for lower level simulations.
But it is just preliminary idea, as we need to coordinate it with probability of branches in MWI and also find the ways to prove it.
Interesting idea. So I guess that approach is focused on measure across universes with physics similar to ours? I wonder what fraction of simulations have physics similar to one level up. Presumably ancestor simulations would.