| viXra.org > Number Theory > viXra:2109.0016 |
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| viXra.org > Number Theory > viXra:2109.0016 |
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Number Theory |
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Authors: Zeolla Gabriel Martin
Este texto desarrolla un nuevo Algoritmo de Primalidad, este obtiene resultados opuestos al pequeño teorema de Fermat, ya que utiliza mecanismos similares pero aplicados al análisis de patrones. En el Teorema de Fermat siempre hay Pseudoprimos escondidos entre los primos, lo cual no da certezas sobre la primalidad de un número impar analizado, más allá del cambio de bases como sucede con el número Pseudoprimo 561. En el algoritmo Argentest sucede lo contrario los pseudoprimos no pasan el test, por lo cual podemos confirmar la primalidad de un número con absoluta certeza y determinación, pero hay un porcentaje de primos que tampoco pasan el test, por lo cual acudimos al cambio de base para volver a analizar los patrones y confirmar la primalidad luego.
This text develops a new Primality Algorithm, this one obtains opposite results to Fermat's little theorem, since it uses similar mechanisms but applied to the analysis of patterns. In Fermat's Theorem there are always Pseudoprimes hidden among the primes, which does not give certainty about the primality of an odd number analyzed, beyond the change of bases as happens with the Pseudoprime number 561. In the Argentest algorithm, the opposite happens, the pseudoprimes do not pass the test, so we can confirm the primality of a number with absolute certainty and determination, but there is a percentage of primes that do not pass the test either, so we go to the base change to re-analyze the patterns and confirm primality later
Comments: 23 Pages. Español
Download: PDF
[v1] 2021-09-02 20:36:03
Unique-IP document downloads: 159 times
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