Previously, we used a restricted axiom of choice, CC(2 through m), countable choice for a family of sets of 2 through m elements, and we saw that we can move from a world with non restricted Evil to a world with restricted Evil because the numbers of attributes of Evil are infinite products of integers and "most" of them do not exist in the right mathematical universes.
Now, we are going to see other consequences of restricting Evil.
A hint for a proof that souls are immortal :
The number of attributes of souls are integers. Souls are the counterparts in the philosophical universe of integers in the mathematical universes.
And we have an infinity of universes in which integers are the same.
Thus, souls are immortal.
The equation with infinite products zzz...z...=xx...x...+yy...y... with z>y has no solution in the universe where only the restricted axiom CC(2 through x) is true. It is because otherwise the infinite products xx...x... and yy...y... exist but not zzz...z... and we cannot have a side of the equation existing and the other not.
The counterpart is that the numbers of attributes of Evil cannot be combined in the right philosophical universes. Once the principals of Good applied, history stops because principles of Good are not connected to time.
The analogy between mathematical concepts and philosophical ones and surrounding the relation number of attributes can be reversed to better understand the mathematical universes from the understanding of the philosophical universes.
As time, the counterpart of history, ceases also to exist, we could be at once in all the infinity of mathematical universes where only CC(2 through m) is true for every integer m. Now, if Evil is restricted, there is a problem about fate. It could be argued that people are doing evil because of their fate. To that we reply that fate has multiple readings. And because of the multiple readings, freedom of choice is allowed.
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