For integers $0 < r \leq t$, let the function $D_{r,t}(n)$ denote the number of parts among all partitions of $n$ into distinct parts that are congruent to $r$ modulo $t$. We prove the asymptotic formula $$D_{r,t}(n) \sim \dfrac{3^{\frac 14} e^{\pi \sqrt{\frac{n}{3}}}}{2\pi t n^{\frac 14}} \left( \log(2) + \left( \dfrac{\sqrt{3} \log(2)}{8\pi} - \dfrac{\pi}{4\sqrt{3}} \left( r - \dfrac{t}{2} \right) \right) n^{- \frac 12} \right)$$ as $n \to \infty$. A corollary of this result is that for $0 < r < s \leq t$, the inequality $D_{r,t}(n) \geq D_{s,t}(n)$ holds for all sufficiently large $n$. We make this effective, showing that for $2 \leq t \leq 10$ the inequality $D_{r,t}(n) \geq D_{s,t}(n)$ holds for all $n > 8$.Comment: Corrects incorrect ...
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In this paper, we establish asymptotics of radial limits for certain functions of Wright. These fun...
AbstractSzekeres proved, using complex analysis, an asymptotic formula for the number of partitions ...
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We prove asymptotic formulas for the complex coefficients of $(\zeta q;q)_\infty^{-1}$, where $\zeta...
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26 pages, accepté pour publication dans le journal Functiones et approximatioInternational audienceL...
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International audienceLet $d\ge 2$ be an integer. We prove that for almost all partitions of an inte...
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We improve S.-C. Chen's result on the parity of Schur's partition function. Let $A(n)$ be the number...
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