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Define a form of continuity on functions from NN+oo to 2o as follows:
NN+oocn = { f e. ( 2o ^m NN+oo ) | E. m e. _om A. n e. _om
( m C_ n -> ( f ` n ) = ( f ` ( x e. _om |-> 1o ) ) ) }
Or in words, a function is continuous (in this sense) if there is a natural number such that every value of the function at a greater natural number equals the value of the function at the point at infinity.
Theorem:
_om e. WOmni <-> E. f e. ( 2o ^m NN+oo ) -. f e. NN+oocn
Corollary:
-. _om e. Womni <-> A. f e. ( 2o ^m NN+oo ) -. -. f e. NN+oocn
This is all taken from a Mastodon thread by Martin Escardo at https://mathstodon.xyz/@MartinEscardo/112809256762862829
Define a form of continuity on functions from
NN+ooto2oas follows:Or in words, a function is continuous (in this sense) if there is a natural number such that every value of the function at a greater natural number equals the value of the function at the point at infinity.
Theorem:
Corollary:
(follows immediately by https://us.metamath.org/ileuni/notbii.html and https://us.metamath.org/ileuni/alnex.html ).
Interesting constructive theorem:
There's a bit more in the thread but it involves additional definitions, so the above would be a good place to start.
There's an agda formalization at https://www.cs.bham.ac.uk/~mhe/TypeTopology/TypeTopology.DecidabilityOfNonContinuity.html#3537
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