Wikipedia:Reference desk/Archives/Mathematics/2021 November 5

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November 5

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Pillai's theorem:  

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For every  , Pillai's theorem states the following:

  • The difference   for any λ less than 1, uniformly in m and n.

I wonder if one can prove (e.g. by his theorem) the following claim:

  • There exists  , such that for every  , there exist   such that every   satisfy  .

If the answer is positive, and   is the minimal prime larger than any given  , then I also wonder if one can prove (e.g. by his theorem) the following:

  • There exists  , such that for every  , there exist   such that every   satisfy  .

185.24.76.181 (talk) 14:11, 5 November 2021 (UTC)[reply]

I'd like to see a precise statement of the theorem, written out with explicit quantifiers. Perhaps I misunderstand the   notation, but I doubt that, uniformly,
 
 --Lambiam 18:31, 5 November 2021 (UTC)[reply]
Well, he at least means that for every   and every  , there exist   such that every   satisfy   for any λ less than 1. 185.24.76.176 (talk) 19:23, 6 November 2021 (UTC)[reply]
So set   and given   and   with the stated property whose existence is promised for these values, set   Then the lhs of the inequation equals   while the rhs equals    --Lambiam 22:57, 6 November 2021 (UTC)[reply]
Well, I was wrong with my interpretation. Reading our article about Pillai's theorem, I'm sure he at least meant that for every  , there exist   such that every   satisfy   for any λ less than 1. 185.24.76.176 (talk) 23:26, 6 November 2021 (UTC)[reply]
Then set   and the rest as before.  --Lambiam 23:55, 6 November 2021 (UTC)[reply]
Oh, so weird! Thanks to your comment, now I wonder what our article means - quoting Pillai's theorem. 185.24.76.176 (talk) 10:53, 7 November 2021 (UTC)[reply]