What is Neother's theorem?
It says "If a system has a continuous symmetry property, then there are corresponding quantities whose values are conserved in time".
But if the rule of the system is something like value[t + 1] = value[t] * 2 (the rule doesn't change in time. time symmetric), apparently there are no conserved quantity.
So what does the theorem actually mean?
It says "If a system has a continuous symmetry property, then there are corresponding quantities whose values are conserved in time".
But if the rule of the system is something like value[t + 1] = value[t] * 2 (the rule doesn't change in time. time symmetric), apparently there are no conserved quantity.
So what does the theorem actually mean?
