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Lift maximization in a flow around a system of two smooth contours is reduced to an isoperimetric variational problem, which is solved numerically. Examples are presented
Maximizing the lift coefficient of a jet-blown contour. The problem is reduced to the isoperimetric variational problem, which is solved numerically. It is necessary
Three-weighted Hardy-type inequality on the cone of quasi-monotone functionsThree-weighted Hardy-type inequalities are investigated on a set of functions possessing monotony
The Maxwell effect for polymer solutions at larger velocity gradients to determine the particle dimensions have been established. The formulae indicate a monotony of the theoretical
Analytical solutions and estimates for microlevel flows of isoperimetric estimations, complex analysis, and asymptotic approximations. The Carman-Kozeny averaging
About restrictions on maximum velocity in inverse boundary-value problems of aerohydrodynamics models of the mechanics of fluids and gases for the isoperimetrical restrictions and separation-free flow
Maximizing the lift coefficient of a jet-blown contour. The problem is reduced to the isoperimetric variational problem, which is solved numerically. It is necessary
Steady, two-dimensional flow of ground water to a trench is determined from the solution for extremum problems. The isoperimetric constraints selected for solution
A note on the optimum profile of a sprayless planing surface force. The lift is maximized under the only isoperimetric constraint of fixed total arclength
The Maxwell effect for polymer solutions at larger velocity gradients to determine the particle dimensions have been established. The formulae indicate a monotony of the theoretical
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