- 84
- 7
So, quick question, Is High 1-A bounded by dimensionality like 1-A is now?
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High 1-A is a inaccessible cardinal of dimensions, not inaccessible cardinal's themselves.High 1-A is inaccessible cardinals.
Tier 0 by current standardsWait hold on, so if a character transcended the concept of cardinality (with context ofc) what would that be exactly?
No... The criteria for most of the tiers is transcending high levels of dimensionality, such as the dimensionality being equivalent to aleph 2, aleph 3, inaccessible cardinal's, etc.Tier 0 by current standards
But isn't infinite cardinals made to create ideas of how big the universe is?High 1-A is a inaccessible cardinal of dimensions, not inaccessible cardinal's themselves.
High1a can still be bounded by dimensions depending on context, you just need to have inaccessible cardinal in a scale, so if there is a dimension that scales to inaccessible cardinal then theres that so it really just depends.So, quick question, Is High 1-A bounded by dimensionality like 1-A is now?
I’d say no. If High 1-A can be mathematically represented by Inaccessible cardinal, then that’d not be the case. Inaccessible cardinal in short, can’t be acquired by small “sum” of smaller cardinals, with any operations that participate with the idea of arithmetic cardinal.So, quick question, Is High 1-A bounded by dimensionality like 1-A is now?