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Anahi Jensen

Anahi Jensen

Answered question

2022-05-21

I'm aware that R is not the only set that satisfies the least upper bound property, the p-adics do also. Does the intermediate value theorem also hold in the p-adics then?

What are the spaces where the intermediate value theorem hold?

Answer & Explanation

Julien Carrillo

Julien Carrillo

Beginner2022-05-22Added 13 answers

The intermediate value theorem can be generalized for topological spaces. For me, this makes sense, since the hypotheses for the IVT are in essence that given a function f : X Y, where X , Y are topological spaces and

1. X is connected

2. f is continuous

3. There is some ordering on ( Y , < ) (equipped with the order topology)

then the intermediate value theorem holds.

We need hypothesis 1 and 2 to make sure that (heuristically at least) there are no "jumps" in the values our function takes. For example, f : ( , 0 ) ( 0 , ) R given by f ( x ) = 1 / x is continuous, but its domain is disconnected, so we cannot guarantee that the function takes on the value 0. On the other hand take f to be any step function on a connected domain, and note that it fails to satisfy the intermediate value theorem.

Hypothesis 3 is there simply to make sense of the theorem anyway. Our IVT for R can be recovered by noting that the connected components of the real line are exactly the rays and intervals.

If I'm not mistaken, the p-adic rationals are totally disconnected, so it seems unlikely that there would exist a generalization to this setting.

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