How can I show, that $N\uparrow\uparrow N$ is not "much larger" than $N$ for very large $N\ $?

197 Views Asked by Bumbble Comm At 25 Mar 2026 - 5:21

Here :

https://sites.google.com/site/largenumbers/home/3-2/knuth

Saibian demonstrates that for very large numbers $N$, $N\uparrow\uparrow N$ is only "slightly larger" than $N$.

I would like to demonstrate it for the number

$$N=4\uparrow^4 4=4\uparrow^3 4\uparrow^3 4\uparrow^3 4$$

I want to bound $N\uparrow\uparrow N$ from above. I think $4\uparrow^5 4$ would be an upper bound, but even if this is the case, I would like to find a better upper bound.

For which $k$ do we have $4\uparrow\uparrow\uparrow k>N\uparrow\uparrow N\ $ ?

The value $k$ should be near $4\uparrow^3 4\uparrow^3 4$. This would show that $N\uparrow\uparrow N$ is "not much larger" than $N$.

Original Q&A

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Bumbble Comm On 06 Jun 2016 - 2:45 BEST ANSWER

Letting $M = 4\uparrow^3 4 \uparrow^3 4$, we have

$$ 4\uparrow^3(M+1) = 4 \uparrow\uparrow (4 \uparrow^3 M) = 4\uparrow\uparrow N < N \uparrow\uparrow N$$

but

$$ 4 \uparrow^3 (M+2) = 4\uparrow\uparrow (4 \uparrow\uparrow (4 \uparrow^3 M)) = 4\uparrow\uparrow (4 \uparrow\uparrow N) > 4 \uparrow\uparrow (2N) > (4 \uparrow\uparrow N) \uparrow\uparrow N > N \uparrow\uparrow N $$

How can I show, that $N\uparrow\uparrow N$ is not "much larger" than $N$ for very large $N\ $?

There are 1 best solutions below

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