We prove asymptotic formulas for the complex coefficients of $(\zeta q;q)_\infty^{-1}$, where $\zeta$ is a root of unity, and apply our results to determine secondary terms in the asymptotics for $p(a,b,n)$, the number of integer partitions of $n$ with largest part congruent $a$ modulo $b$. Our results imply that, as $n \to \infty$, the difference $p(a_1,b,n)-p(a_2,b,n)$ for $a_1 \neq a_2$ oscillates like a cosine, when renormalized by elementary functions. Moreover, we give asymptotic formulas for arbitrary linear combinations of $\{p(a,b,n)\}_{1 \leq a \leq b}$.Comment: Typos and grammatical errors fixe
AbstractAsymptotic results, similar to those of Roth and Szekeres, are obtained for certain partitio...
We address the problem of ambiguity of a function determined by an asymptotic perturbation expansion...
International audienceImproving on some results of J.-L. Nicolas, the elements of the set ${\cal A}=...
In their famous paper on partitions, Hardy and Ramanujan also raised the question of the behaviour o...
In this paper, we establish asymptotics of radial limits for certain functions of Wright. These fun...
For integers $0 < r \leq t$, let the function $D_{r,t}(n)$ denote the number of parts among all part...
Using the Saddle point method and multiseries expansions, we obtain from the exponential formula and...
AbstractThe relation between the exponential sums SN(x;p)=∑n=0N−1exp(πixnp) and T0≡T0(x;N,p)=∑n=1∞e−...
AbstractAsymptotic expansions, similar to those of Roth and Szekeres, are obtained for the number of...
PART I G. H. Hardy and S. Ramanujan established an asymptotic formula for the number of unrestrict...
AbstractAsymptotic results are obtained for pA(k)(n), the kth difference of the function pA(n) which...
AbstractSzekeres proved, using complex analysis, an asymptotic formula for the number of partitions ...
We apply the saddle-point method to derive asymptotic estimates or asymptotic series for the number ...
AbstractLet σ=(σ1,…,σN), where σi=±1, and let C(σ) denote the number of permutations π of 1,2,…,N+1,...
AbstractWe consider two dimensional arrays p(n,k) which count a family of partitions of n by a secon...
AbstractAsymptotic results, similar to those of Roth and Szekeres, are obtained for certain partitio...
We address the problem of ambiguity of a function determined by an asymptotic perturbation expansion...
International audienceImproving on some results of J.-L. Nicolas, the elements of the set ${\cal A}=...
In their famous paper on partitions, Hardy and Ramanujan also raised the question of the behaviour o...
In this paper, we establish asymptotics of radial limits for certain functions of Wright. These fun...
For integers $0 < r \leq t$, let the function $D_{r,t}(n)$ denote the number of parts among all part...
Using the Saddle point method and multiseries expansions, we obtain from the exponential formula and...
AbstractThe relation between the exponential sums SN(x;p)=∑n=0N−1exp(πixnp) and T0≡T0(x;N,p)=∑n=1∞e−...
AbstractAsymptotic expansions, similar to those of Roth and Szekeres, are obtained for the number of...
PART I G. H. Hardy and S. Ramanujan established an asymptotic formula for the number of unrestrict...
AbstractAsymptotic results are obtained for pA(k)(n), the kth difference of the function pA(n) which...
AbstractSzekeres proved, using complex analysis, an asymptotic formula for the number of partitions ...
We apply the saddle-point method to derive asymptotic estimates or asymptotic series for the number ...
AbstractLet σ=(σ1,…,σN), where σi=±1, and let C(σ) denote the number of permutations π of 1,2,…,N+1,...
AbstractWe consider two dimensional arrays p(n,k) which count a family of partitions of n by a secon...
AbstractAsymptotic results, similar to those of Roth and Szekeres, are obtained for certain partitio...
We address the problem of ambiguity of a function determined by an asymptotic perturbation expansion...
International audienceImproving on some results of J.-L. Nicolas, the elements of the set ${\cal A}=...