Multinode finite element based on boundary integral equations

In this article we study Galerkin finite element approximations to integral equations of the Volterra type. Our prime concern is the noncoercive case, which is not covered by the standard finite element theory. The question of rates of convergence is studied for the case where an exact stiffness mat

We present the integrated-by-parts version of the time discontinuous Galerkin least-squares ®nite element formulation for the solution of the unsteady compressible Navier±Stokes equations for three dimensional problems involving moving boundaries and interfaces. The deformation of the spatial domain

In this letter, a hybrid algorithm combining the direct method with the iterati¨e method is designed for sol¨ing the FE᎐BI matrix equation, which not only can take full ad¨antage of the multile¨el ( ) fast multipole algorithm MLFMA , but also can significantly speed up the rate of con¨ergence. Numer

The circular loop antenna is analysed by using the electric ®eld integro-dierential equation in the frequency domain. The weak form of the integro-dierential is derived and then the current distribution along the circular loop antenna is calculated by solving the resulting equation via the ®nite ele

The conventional boundary integral equation in two dimensions is non-equivalent to its corresponding boundary value problem when the scale in the fundamental solution reaches its degenerate scale values. An equivalent boundary integral equation was recently derived. This equation has the same soluti