The present work is concerned with the problem of mode Ⅲ crack perpendicular to the interface of a bi-strip composite. One of these strips is made of a functionally graded material and the other of an isotropic mater...The present work is concerned with the problem of mode Ⅲ crack perpendicular to the interface of a bi-strip composite. One of these strips is made of a functionally graded material and the other of an isotropic material, which contains an edge crack perpendicular to and terminating at the interface. Fourier transforms and asymptotic analysis are employed to reduce the problem to a singular integral equation which is numerically solved using Gauss-Chebyshev quadrature formulae. Furthermore, a parametric study is carried out to investigate the effects of elastic and geometric characteristics of the composite on the values of stress intensity factor.展开更多
In this study,a(3+1)dimensional unstable gas flow system is applied and solved successfully via differential quadrature techniques based on various shape functions.The governing system of nonlinear four-dimensional un...In this study,a(3+1)dimensional unstable gas flow system is applied and solved successfully via differential quadrature techniques based on various shape functions.The governing system of nonlinear four-dimensional unsteady Navier–Stokes equations of gas dynamics is reduced to the system of nonlinear ordinary differential equations using different quadrature techniques.Then,Runge-Kutta 4th order method is employed to solve the resulting system of equations.To obtain the solution of this equation,a MATLAB code is designed.The validity of these techniques is achieved by the comparison with the exact solution where the error reach to ≤1×10^(-5).Also,these solutions are discussed by seven various statistical analysis.Then,a parametric analysis is presented to discuss the effect of adiabatic index parameter on the velocity,pressure,and density profiles.From these computations,it is found that Discrete singular convolution based on Regularized Shannon kernels is a stable,efficient numerical technique and its strength has been appeared in this application.Also,this technique can be able to solve higher dimensional nonlinear problems in various regions of physical and numerical sciences.展开更多
文摘The present work is concerned with the problem of mode Ⅲ crack perpendicular to the interface of a bi-strip composite. One of these strips is made of a functionally graded material and the other of an isotropic material, which contains an edge crack perpendicular to and terminating at the interface. Fourier transforms and asymptotic analysis are employed to reduce the problem to a singular integral equation which is numerically solved using Gauss-Chebyshev quadrature formulae. Furthermore, a parametric study is carried out to investigate the effects of elastic and geometric characteristics of the composite on the values of stress intensity factor.
文摘In this study,a(3+1)dimensional unstable gas flow system is applied and solved successfully via differential quadrature techniques based on various shape functions.The governing system of nonlinear four-dimensional unsteady Navier–Stokes equations of gas dynamics is reduced to the system of nonlinear ordinary differential equations using different quadrature techniques.Then,Runge-Kutta 4th order method is employed to solve the resulting system of equations.To obtain the solution of this equation,a MATLAB code is designed.The validity of these techniques is achieved by the comparison with the exact solution where the error reach to ≤1×10^(-5).Also,these solutions are discussed by seven various statistical analysis.Then,a parametric analysis is presented to discuss the effect of adiabatic index parameter on the velocity,pressure,and density profiles.From these computations,it is found that Discrete singular convolution based on Regularized Shannon kernels is a stable,efficient numerical technique and its strength has been appeared in this application.Also,this technique can be able to solve higher dimensional nonlinear problems in various regions of physical and numerical sciences.
