Abstract:
The aim of this paper is to derive new optimal bounds for the rate of strong Gaussian approximation of sums of i.i.d. $\mathbf R^d$-valued random variables $\xi_j$ having finite moments of the form $\mathbf E\,H(|\xi_j|)$, where $H(x)$ is a monotone function growing not slower than $x^{2+\delta}$ and not faster than $e^{cx}$. We obtain some generalizations of the results of U. Einmahl (1989). Bibl. – 44 titles.