On powers of the diophantine function $\star:x\mapsto x(x+1)$
| Autor: | Silberger, Donald |
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| Rok vydání: | 2024 |
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| Druh dokumentu: | Working Paper |
| Popis: | We treat the functions $\star^k:{\mathbf N}\rightarrow{\mathbf N}$ where $\star:x\mapsto \star x := x(x+1)$. The set $\{\star^k x: \{x,k\}\subset{\mathbf N}\}$ offers a short and direct proof that the set of primes is infinite. We introduce the ``mother sequence,'' M, obtained by factoring into prime powers the terms of $2,3,4,\ldots$. For each $x\ge2$ we introduce the infinite sequence $x^\star$ obtained by factoring the terms of the ``gross $x$-sequence,'' $\gamma_\star(x) :=\langle x+1;\star x+1;\star^2x+1;\star^3x+1;\ldots\rangle$, into prime powers. It turns out that $\gamma_\star(1)$ is Sylvester's sequence, A00058 in the On-Line Encyclopedia of Integer Sequences - OEIS, and that $\gamma_\star(2)$ is the sequence A082732 in the OEIS. Theorem 2. For some integers $x\ge1$ there are primes that are factors of no member of $\{\star^kx: k\ge0\}$. Theorem 3. For each $x\ge2$ there is are infinitely many infinite subsequences ${\sf c}_j$ of M such that $x^\star = {\sf c}_j$ and such that the infinite family of term sets in M of those ${\sf c}_j$ is pairwise disjoint. Comment: 3 pages |
| Databáze: | arXiv |
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