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Numerical models of cosmological evolution of a degenerate Fermi-system of scalar charged particles statistical Fermi system with particle interaction, in this paper we construct and analyze numerical models
Numerical simulation of non-fickian diffusion and advection in a fractured porous aquifer porous media, has been developed. The conventional mathematical model of solute transport in a rock
Numerical study of wave penetration in port waters by numerical simulation using for example the port of Ust-Luga. For this were applied actual numerical models
The optimal control of a multi-mass vibration propulsion system in a viscous incompressible fluid. At the first stage the simplified model of a viscous fluid is considered. On the basis of this model
Numerical simulation of heat and mass transfer processes in large-scale fluidized bed complex structure apparatus as an example of the reactor of isoparaffins dehydrogenation. In numerical simulation of fluidization was extended Eulerian-Eulerian approach. Differential equations
Numerical simulation of ground-penetrating radar data for studying the geometry of fault zone. We performed a series of numerical models of a fault, changing its geometry with increasing
Numerical methods of the decision differential the equations for continuous models of economy of some models of economy based on application of the ordinary differential equations is provided
Numerical simulation for Non-Fickian diffusion into fractured porous rock. It is therefore necessary to develop models for predicting solute transport in subsurface rock masses in order
Simulation of a Loss in Stability of the Middle Layer of the Three-Layered Rod Under Tension-dimensional finite-element model is used for the numerical solution). On the basis of the performed calculations
Pseudo-differential operators in an operational model of the quantum measurement of observables of more complicated form. A stable numerical method for studying the discrete spectra of the measured
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