Data di Pubblicazione:
2012
Citazione:
Extremal values for the sum $\sum_{r=1}^\tau e(a 2^r/q)$ / J. Kaczorowski, G. Molteni. - In: JOURNAL OF NUMBER THEORY. - ISSN 0022-314X. - 132:11(2012 Nov), pp. 2595-2603.
Abstract:
Let $q$ be an odd integer, let $\tau$ be the order of $2$ modulo $q$, and let $a$ be coprime with $q$.
Finally, let $s(a/q) := \sum_{r=1}^\tau e(a 2^r/q)$. We prove that $|s(a/q)|$ can be as large as
$\tau-c'$ for a suitable constant $c'$ for infinitely many $q$, but that $\max_{(a,q)=1}|s(a/q)|$ is
always bounded from above by $\tau-c$ for a suitable positive constant $c$ whose value is considerably
larger that any previously known. An upper bound for $\min_{(a,q)=1}|s(a/q)|$ is also discussed.
Tipologia IRIS:
01 - Articolo su periodico
Keywords:
Exponential sums
Elenco autori:
J. Kaczorowski, G. Molteni
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