Sharp convergence bounds for sums of POD and SPOD weights
Authors
Zexin Pan
Abstract
This work analyzes the convergence of sums of the form $S_{\boldsymbolγ}(m)=\sum_{v\subseteq \mathbb{N}}γ_v m^{|v|}$, where $γ_v$ are product and order dependent (POD) weights. We establish that for nonnegative sequence $\{Υ_j\mid j\in \mathbb{N}\}$, $$\sum_{v\subseteq \mathbb{N}} |v|! m^{|v|}\prod_{j\in v} Υ_j<\infty \text{ for } m>0 \text{ if and only if } \sum_{j=1}^\infty Υ_j<\infty.$$ We further characterize the growth of $S_{\boldsymbolγ}(m)$ when $γ_v=(|v|!)^σ\prod_{j\in v}j^{-ρ}$ and prove that $\log S_{\boldsymbolγ}(m)$ exhibits asymptotic order $m^{1/(ρ-σ)}$ when $ρ>σ$. All results are subsequently generalized to smoothness-driven product and order dependent (SPOD) weights.
