Publications
99 results found
Chernyshenko SI, 1984, MEAN DISTANCE BETWEEN PARTICLES IN A DUST-LADEN GAS WHEN THERE ARE SINGULARITIES IN THE SMOOTHED PARTICLE DENSITY., Moscow University mechanics bulletin, Vol: 39, Pages: 34-37, ISSN: 0027-1330
It is shown that, although the density of the dispersed phase becomes infinite on the envelop of the family of trajectories of reflected particles, the mean distance between particles remains finite. A formula is obtained for the mean distance when there are density singularities.
Chernyshenko SI, 1984, Calculation of low-viscosity flows with separation by means of Batchelor's model, Fluid Dynamics, Vol: 19, Pages: 206-211, ISSN: 0015-4628
The paper analyzes the conditions of applicability and examples of the application of Batchelor's model. © 1984 Plenum Publishing Corporation.
CHERNYSHENKO SI, 1984, MEAN DISTANCE BETWEEN PARTICLES IN A DUST-LADEN GAS WITH SINGULARITIES OF SPREAD PARTICLE DENSITY, VESTNIK MOSKOVSKOGO UNIVERSITETA SERIYA 1 MATEMATIKA MEKHANIKA, Pages: 69-70, ISSN: 0579-9368
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- Citations: 2
Chernyshenko SI, 1983, HEAT TRANSFER IN TOROIDAL TUBES AT LARGE PRANDTL NUMBERS., Moscow University mechanics bulletin, Vol: 38, Pages: 24-28, ISSN: 0027-1330
The temperature distribution in the cross section of a toroidal tube as Pr yields infinity is considered. In the limit, the temperature is constant along the current lines of the secondary flow. The temperature distribution along the streamlines satisfies an equation obtained from the initial equation (Pr does not equal infinity ) by integration over the closed streamlines. The boundary condition for this equation follows from the closure of the boundary layer around the tube wall and the symmetry plane.
Chernyshenko SI, 1983, Heat transfer in toroidal pipes when the Prandtl number is large, Vestnik Moskovskogo Universiteta. Seriya I. Matematika, Mekhanika, Pages: 87-90
CHERNYSHENKO SI, 1983, STATIONARY LOW-VISCOSITY FLUID-FLOWS IN CHANNELS AND TUBES OF PERIODIC PROFILE, DOKLADY AKADEMII NAUK SSSR, Vol: 268, Pages: 314-316, ISSN: 0002-3264
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- Citations: 1
Chernyshenko SI, 1982, An approximate method of determining the vorticity in the separation region as the viscosity tends to zero, Fluid Dynamics, Vol: 17, Pages: 7-12, ISSN: 0015-4628
In accordance with the Prandtl-Batchelor theorem, the vorticity in a separation region is constant in a laminar flow with vanishingly small viscosity. Batchelor proposed that the vorticity should be determined by matching the inviscid flow and the boundary layer at the edge of the separation region. An approximate method is constructed and, under a number of simplifying assumptions, used to consider a flow with a separation region in a rectangular trough. © 1982 Plenum Publishing Corporation.
Chernyshenko SI, 1980, ENERGY CRITERION FOR APPEARANCE OF SELF-EXCITED OSCILLATIONS., Moscow University mechanics bulletin, Vol: 35, Pages: 6-10, ISSN: 0027-1330
Proof of a theorem is presented which can be applied to vibrations of aerostatic supports with a flexible enclosure for the air cushion zone.
CHERNISHENKO SI, 1980, AN ENERGY CONDITION FOR GENERATING AUTO-OSCILLATIONS, VESTNIK MOSKOVSKOGO UNIVERSITETA SERIYA 1 MATEMATIKA MEKHANIKA, Pages: 62-66, ISSN: 0579-9368
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