Is this simply one statement ? Is Solomonoff complexity additive with multiple statements that must be true at once ?
Or is it possible that we can calculate the probability as a chain of Solomonoff complexities, something like:
s1, s2 … etc are the statements. You need all of them to be true: magic powers, matrix, etc. Are they simply considered as one statement with one Solomonoff complexity K = 2^(x) ? Or K1K2… = 2 ^ (x1 + x2 + …) ? Or K1^K2^… = 2^(2^(2^...)) ?
And if it’s considered as one statement, does simply calculating the probability with K1^K2^… solve the problem ?
Point taken on the summation of the possibilities, they might not sum to zero.
Also, does invoking “magic powers” equal invoking an infinite ? It basically says nothing except “I can do what I want”
Is this simply one statement ? Is Solomonoff complexity additive with multiple statements that must be true at once ? Or is it possible that we can calculate the probability as a chain of Solomonoff complexities, something like:
s1, s2 … etc are the statements. You need all of them to be true: magic powers, matrix, etc. Are they simply considered as one statement with one Solomonoff complexity K = 2^(x) ? Or K1K2… = 2 ^ (x1 + x2 + …) ? Or K1^K2^… = 2^(2^(2^...)) ?
And if it’s considered as one statement, does simply calculating the probability with K1^K2^… solve the problem ?
Point taken on the summation of the possibilities, they might not sum to zero.
Also, does invoking “magic powers” equal invoking an infinite ? It basically says nothing except “I can do what I want”