
arXiv: 1201.5713
Let $γ_n$ ($n\in \mathbb{Z}_{\ge0}$) be a sequence of complex numbers, which is tame: $00$. We show a resonance between the singularities of the function of the power series $P(t):=\sum_{n=0}^\infty γ_n t^n$ on its boundary of the disc of convergence and the oscillation behavior of the sequences $γ_{n-k}/γ_n$ ($n\in \mathbb{Z}_{>>0}$) for $k>0$. The resonance is proven by introducing the space of opposite power series, which is the compact subspace of the space of all formal power series in the opposite variable $s=1/t$ and is defined as the accumulating set of the sequence $X_n(s):=\sum_{k=0}^n\frac{γ_{n-k}}{γ_n}t^k$ ($n\in \mathbb{Z}_{\ge0}$). We analyze in details an example of the growth series $P(t)$ for the modular group $PSL(2,Z)$ due to Machi.
25 pages
Computational Theory and Mathematics, Mathematics - Classical Analysis and ODEs, Classical Analysis and ODEs (math.CA), FOS: Mathematics, Geometry and Topology, Group Theory (math.GR), Mathematics - Group Theory, Theoretical Computer Science
Computational Theory and Mathematics, Mathematics - Classical Analysis and ODEs, Classical Analysis and ODEs (math.CA), FOS: Mathematics, Geometry and Topology, Group Theory (math.GR), Mathematics - Group Theory, Theoretical Computer Science
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