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The result is effectively derived in the reference for above. I overlooked this at first.

I would like to compute the asymptotics of the resulting sum $S$ when computing the number of possibilities to distribute $k$ indistinguishable objects in $m$ distinguishable boxes with size limitation … If I define the quasi-continuous variable $x=k/m$, I expect the asymptotics \begin{align} S_{m,R}(x)\sim \alpha p(m) e^{\beta m-\gamma(x-x_0)^2 m}\quad\text{as}\quad m\to\infty\,, \end{align} where $p( …