Abstract
Full Text
TECHNICAL PHYSICS
| Pages | |
|---|---|
| E. A. Dukhovskoi, I. V. Kragel’skii, A. A. Silin. Controlling the adhesion component of friction | 560 |
| V. D. Evdokimov. Exoelectronic emission in sliding friction | 563 |
| V. V. Nemoshkalenko, V. J. Nagornyi. The fine structure of X-ray emission bands in the case of iron-group transition elements | 566 |
GEOPHYSICS
| Pages | |
|---|---|
| I. N. Meshcherskii, A. P. Raizman. Vertical movements of the earth surface in the Tashkent area | 570 |
| E. N. Mikhailova, A. I. Felsenbaum, N. B. Shapiro. A contribution to the non-linear theory of currents at the equator | 574 |
| V. V. Shuleikin. Calculation of vertical currents in a sea with a complex bottom relief | 578 |
CRYSTALLOGRAPHY
| Pages | |
|---|---|
| E. V. Sobolev, V. I. Lisoivan, S. V. Lenskaia. X-ray diffraction spikes as related to optical properties of natural diamonds | 582 |
| R. P. Shibaeva, L. O. Atovmian, R. G. Kostianovskii. The structure of the amide group in n-bromobenzoylethylenimine | 586 |
CORRECTIONS
In our article (N. I. Arbuzova, V. L. Danilov, “On a Problem of Stochastic Linear Programming and Its Stability”), published in DAN, vol. 162, no. 1, 1965, the following corrections must be made.
On p. 33, line 5 from the bottom, where “ellipsoid” is printed, read “parallelepiped.”
On p. 33, line 2 from the bottom, where “ellipsoid by an ellipsoid” is printed, read “parallelepiped by a polyhedron.”
On p. 34, line 14 from the bottom, where “ellipsoid” is printed, read “polyhedron.”
On p. 34, line 7 from the bottom, where \(d > q\zeta\) is printed, read \(d > nq\zeta\).
N. I. Arbuzova, V. L. Danilov
In my article (G. S. Litvinchuk, “Noether Theorems for a Class of Singular Integral Equations with Shift and Conjugation”), published in DAN, vol. 162, no. 1, 1965, assumption 2, 3, 4, and theorem 2 concern the case of even \(n\). The case of odd \(n\) is studied trivially; here \(l > 2\,\mathrm{Ind}\,\Delta_n(t)\). In the article this case is illustrated by example (6).
G. Litvinchuk
In the article by I. S. Izrailevich and S. N. Novikov, “A New Method for Determining the Specific Surface Area (Particle Size) of Powders by Comparing the Magnitudes of Flows Corresponding to Different Regimes of Gas Flow in a Porous Medium,” published in DAN, vol. 165, no. 1, the following corrections must be made.
| Printed | Should read | |
|---|---|---|
| p. 77, line 28 from the bottom | \(\sigma_g\) | \(G_g\) |
| line 3 from the bottom | \(\sigma_M\) | \(G_M\) |
| p. 78, line 3 from the bottom | \(r^4/\overline{r^3}\) | \(\overline{r^4}/\overline{r^3}\) |
| p. 79, line 1 | \(\alpha_\mu\) | \(d_\mu\) |
| p. 79, line 2 | \(G\) or \(\overline{p}\) | \(G\) at \(\overline{p}\) |
| p. 79, line 7 | \(d_\mu = G/S_0\) | \(d_\mu = 6/S_0\) |