The quantity \({{G}_{{qc}}}\) which is defined right after the formula (2) in the right column on page 1349 should read as follows:

$${{G}_{{qc}}} = 1.7 \times {{10}^{3}}\frac{{\left\langle Z \right\rangle }}{{\left\langle {{{Z}^{2}}} \right\rangle }}\left( {\frac{{{{L}_{{qc}}}}}{{{\lambda }}}} \right)\frac{{{{I}_{{qc}}}{{{{\lambda }}}^{2}}}}{{{{T}_{{e,qc}}}}}{{\xi }_{{qc}}}.$$

The formula (4) presented in the left column on page 1350 should read as follows:

$${{A}_{{{\text{SRS}}}}} = \left\{ \begin{gathered} 0.125{{f}_{{{\text{SRS}}}}}\{ 1 - {\text{exp}}[ - (G_{{{\text{SRS}}}}^{{1/3}} - 1)]\} , \hfill \\ {\text{if}}\quad {{G}_{{{\text{SRS}}}}} \geqslant 1 \hfill \\ 0,\quad {\text{if}}\quad {{G}_{{{\text{SRS}}}}} < 1, \hfill \\ \end{gathered} \right.$$
(4)

The first sentence of the second paragraph in the right column on page 1357 should be the following: According to these calculations, a glass ablator allows one to almost eliminate fast electrons for laser radiation with \({{\lambda }} = 0.35\) μm (see rows 5 and 7 in Tables 6 and 7). The last sentence of the same paragraph should be the following: In this case, according to the calculations (see row 5 in Tables 6 and 7), the ignition margin may reach \({{W}_{Q}} = 1.7\) and the fusion energy yield may be \(E_{{{\text{fus}}.{\text{e}}}}^{*} \approx 42\) MJ.