Author:
Bilchenko G G,Bilchenko N G
Abstract
Abstract
The problems of mathematical modeling of effective control of heat and mass transfer and friction on permeable cylindrical and spherical surfaces of hypersonic aircraft are considered. The systems of ordinary differential equations are obtained by A.A.Dorodnicyn generalized integral relations method to approximate the systems of partial differential equations describing laminar boundary layers on permeable cylindrical and spherical surfaces of hypersonic aircraft. The joint systems are applied in the mathematical model. The parameters of the mathematical model at the flow stagnation point are determined from the joint systems of nonlinear algebraic equations. The blowing into boundary layer, temperature factor and magnetic field are used as controls. Dependences of hypersonic aerodynamics functionals (the total heat flow, the total Newton friction force and total blowing system power) on controls (the linear blowing into boundary layer, the constant temperature factor, the constant magnetic field) are investigated. The domains of allowed values of functionals of hypersonic aerodynamics are obtained. The results of the computational experiments are presented: the dependences of total heat flow on controls; the dependences of total Newton friction force on controls; the dependences of blowing system power on controls; the mutual dependences of functionals (as the domains of allowed values “Heat and Friction”).
Subject
General Physics and Astronomy
Reference17 articles.
1. On a method of laminar boundary layer equations solution;Dorodnitsyn;Applied mathematics and technical physics,1960
2. Calculation of the laminar boundary layer in a compressible gas in the presence of suction or blowing;Shen’-Tsyuan’;USSR Computational Mathematics and Mathematical Physics,1963
3. The numerical calculation of the laminar boundary layer in a compressible gas;Pavlovsky Yu;USSR Computational Mathematics and Mathematical Physics,1963
4. Calculation of the equations of a laminar boundary space layer by the method of integral relations;Bashkin;USSR Computational Mathematics and Mathematical Physics,1968