Difference between revisions of "Kuznetsova theorem"
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(Created page with " ==Kuznetsova theorem== Let \( b>1 \) and \( q>1 \) be integers. Then, there exist positive integer \( Q \) and integer \(r\) such that for any integer \( n > Q \) the e...") |
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==[[Kuznetsova theorem]]== |
==[[Kuznetsova theorem]]== |
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Revision as of 20:17, 23 January 2020
Kuznetsova theorem refers to residual of division of tetration to integer base by any integer number.
Kuznetsova theorem
Let \( b>1 \) and \( q>1 \) be integers.
Then, there exist positive integer \( Q \) and integer \(r\) such that for any integer \( n > Q \) the equation holds:
\( \mathrm{tet}_b(n)\%q = r \)
References
Keywords
Integer number, Tartaria, Tartaria.Math, Tetration, Yulya Kuznetsova