1. The effect of boundary conditions in the numerical solution of 3-D thermoelastic problems
- Author
-
Enrique Alarcón and Juan José Anza
- Subjects
Matemáticas ,Computer science ,General Engineering ,02 engineering and technology ,Mixed boundary condition ,Boundary knot method ,Singular boundary method ,01 natural sciences ,Ingeniería Civil y de la Construcción ,Robin boundary condition ,010101 applied mathematics ,Boundary conditions in CFD ,020303 mechanical engineering & transports ,0203 mechanical engineering ,Free boundary problem ,Applied mathematics ,Method of fundamental solutions ,Boundary value problem ,0101 mathematics - Abstract
After the extensive research on the capabilities of the Boundary Integral Equation Method produced during the past years the versatility of its applications has been well founded. Maybe the years to come will see the in-depth analysis of several conflictive points, for example, adaptive integration, solution of the system of equations, etc. This line is clear in academic research. In this paper we comment on the incidence of the manner of imposing the boundary conditions in 3-D coupled problems. Here the effects are particularly magnified: in the first place by the simple model used (constant elements) and secondly by the process of solution, i.e. first a potential problem is solved and then the results are used as data for an elasticity problem. The errors add to both processes and small disturbances, unimportant in separated problems, can produce serious errors in the final results. The specific problem we have chosen is especially interesting. Although more general cases (i.e. transient)can be treated, here the domain integrals can be converted into boundary ones and the influence of the manner in which boundary conditions are applied will reflect the whole importance of the problem.
- Published
- 1982
- Full Text
- View/download PDF