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dc.contributor.author |
Bellaouar, Djamel |
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dc.date.accessioned |
2018-03-19T13:55:12Z |
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dc.date.available |
2018-03-19T13:55:12Z |
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dc.date.issued |
2015-12-15 |
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dc.identifier.uri |
http://dspace.univ-msila.dz:8080//xmlui/handle/123456789/3723 |
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dc.description.abstract |
This study is placed in the framework of Internal Set Theory. In Chapter 1, we will give a necessary condition for which are simultaneously approximable in the infinitesimal sense. The converse of this condition is also discussed. Let k be a positive integer, and let $W_{k}$ denote the set of all positive integers $n$ such that the number of distinct prime factors of $n$ is greater or equal to $k$. In Chapter 2, we prove the infinity of certain inequalities and equations on the set $W_{k}$ by using $\psi$, $\sigma$, $\tau$ and related functions. In the framework of IST, our working set is an infinite external subset of positive integers. In Chapter 3, we will determine an arithmetic function f for which $f^{N}(n)-\alpha\,f^{N}(n+\ell)$ has infinitely many sign changes on a proper infinite subset of $W_{k}$, where $\alpha$, $N$ and $\ell$ are parameters. This result will be realized by using Dirichlet's Theorem about primes in an arithmetic progression. In Chapter 4, some open problems are posed for further research. |
en_US |
dc.language.iso |
en |
en_US |
dc.publisher |
Université de M'sila |
en_US |
dc.subject |
Internal set theory, simultaneous rational approximation, prime numbers, sign changes, arithmetic functions |
en_US |
dc.title |
ETUDE NON-CLASSIQUE DE QUELQUES INÉGALITÉS FAISANT INTERVENIR LA FONCTION D'EULER φ |
en_US |
dc.type |
Thesis |
en_US |
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