Pseudo $s$-Numbers of Embeddings of Gaussian Weighted Sobolev Spaces
Abstract: In this paper, we study the approximation problem for functions in the Gaussian-weighted Sobolev space $W\alpha_p(\mathbb{R}d, \gamma)$ of mixed smoothness $\alpha \in \mathbb{N}$ with error measured in the Gaussian-weighted space $L_q(\mathbb{R}d, \gamma)$. We obtain the exact asymptotic order of pseudo $s$-numbers for the cases $1 \leq q< p < \infty$ and $p=q=2$. Additionally, we also obtain an upper bound and a lower bound for pseudo $s$-numbers of the embedding of $W\alpha_2(\mathbb{R}d, \gamma)$ into $L_{\infty}{\sqrt{g}}(\mathbb{R}d)$. Our result is an extension of that obtained in Dinh D~ung and Van Kien Nguyen (IMA Journal of Numerical Analysis, 2023) for approximation and Kolmogorov numbers.
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