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We find asymptotical expansions as $ν\to 0$ for integrals of the form $\int_{\mathbb{R}^d} F(x) / \big(ω(x)^2 + ν^2\big)\, dx$, where sufficiently smooth functions $F$ and $ω$ satisfy natural assumptions for their behaviour at infinity and all critical points of the function $ω$ from the set $\{ω(x) = 0\}$ are non-degenerate. These asymptotics play a crucial role when analysing stochastic models for non-linear waves systems. Our result generalizes that of [S. Kuksin, Russ. J. Math. Phys.'2017] where a similar asymptotics was found in a particular case when $ω$ is a non-degenerate quadratic form of the signature $(d/2,d/2)$ with even $d$.