Small Deviations in $L_2$-norm for Gaussian Dependent Sequences (1511.05370v2)

Abstract: Let $U=(U_k){k\in\mathbb{Z}}$ be a centered Gaussian stationary sequence satisfying some minor regularity condition. We study the asymptotic behavior of its weighted $\ell_2$-norm small deviation probabilities. It is shown that [ \ln \mathbb{P}\left( \sum{k\in\mathbb{Z}} d_k^2 U_k^2 \leq \varepsilon^2\right) \sim - M \varepsilon^{-\frac{2}{2p-1}}, \qquad \textrm{ as } \varepsilon\to 0, ] whenever [ d_k\sim d_{\pm} |k|^{-p}\quad \textrm{for some } p>\frac{1}{2} \, , \quad k\to \pm\infty, ] using the arguments based on the spectral theory of pseudo-differential operators by M. Birman and M. Solomyak. The constant $M$ reflects the dependence structure of $U$ in a non-trivial way, and marks the difference with the well-studied case of the i.i.d. sequences.