New approaches in the finite element method for stochastic structures
are proposed. The FEM based on exact inverse of stiffness matrix is fi
rst proposed for bar extension problems with stochastic stiffness. The
method is exemplified by the direct exact inverse of stiffness matrix
for the deformation of the bar under extension. The second new FEM is
based on the diagonalization of the element stiffness matrix and the
inverse of the global stiffness matrix. The method is proposed for bea
m bending problems with stochastic stiffness. The third new FEM is bas
ed on the element-level flexibility and its idea is general applicable
. The new methods avoid the error due to truncating the expansion seri
es of random stiffness matrix, which appears in conventional finite el
ement methods for stochastic structures based on either series expansi
on or perturbation technique. Examples of a stochastic bar under tensi
on and stochastic beams under uniform pressure are analyzed. Compariso
n of the new finite element solution by new approaches and conventiona
l finite element solution by the first-order perturbation is performed
. Numerical results illustrates the superiority of the new proposed me
thods over the conventional FEM for stochastic structures. (C) 1998 El
sevier Science Ltd. All rights reserved.