Approximations of Very Weak Solutions to Boundary-Value Problems

Standard weak solutions to the Poisson problem on a bounded domain have square-integrable derivatives, which limits the admissible regularity of inhomogeneous data. The concept of solution may be further weakened in order to define solutions when data is rough, such as for inhomogeneous Dirichlet data that is only square-integrable over the boundary. Such very weak solutions satisfy a nonstandard variational form (u,v) = G(v). A Galerkin approximation combined with an approximation of the right-hand side G defines a finite-element approximation of the very weak solution. Applying conforming linear elements leads to a discrete solution equivalent to the text-book finite-element solutionto the Poisson problem in which the boundary data is approximated by L2 -projections. The L2 convergence rate of the discrete solution is O(hs) for some $s\in(0,1/2)$ that depends on the shape of the domain, assuming a polygonal (two-dimensional) or polyhedral (three-dimensional) domain without slits and (only) square-integr...

[1]  Max Gunzburger,et al.  On finite element approximations of problems having inhomogeneous essential boundary conditions , 1983 .

[2]  R. Glowinski,et al.  Exact and approximate controllability for distributed parameter systems , 1994, Acta Numerica.

[3]  L. R. Scott,et al.  Finite element interpolation of nonsmooth functions satisfying boundary conditions , 1990 .

[4]  P. Grisvard Elliptic Problems in Nonsmooth Domains , 1985 .

[5]  J. Lions,et al.  Non-homogeneous boundary value problems and applications , 1972 .

[6]  P. Schmid,et al.  Stability and Transition in Shear Flows. By P. J. SCHMID & D. S. HENNINGSON. Springer, 2001. 556 pp. ISBN 0-387-98985-4. £ 59.50 or $79.95 , 2000, Journal of Fluid Mechanics.

[7]  L. R. Scott,et al.  The Mathematical Theory of Finite Element Methods , 1994 .

[8]  M. Gunzburger,et al.  Treating inhomogeneous essential boundary conditions in finite element methods and the calculation of boundary stresses , 1992 .

[9]  P. Grisvard Singularities in Boundary Value Problems , 1992 .

[10]  T. Cebeci Stability and Transition , 2004 .

[11]  James H. Bramble,et al.  A robust finite element method for nonhomogeneous Dirichlet problems in domains with curved boundaries , 1994 .

[12]  Donald A. French,et al.  Analysis of a robust finite element approximation for a parabolic equation with rough boundary data , 1993 .

[13]  J. Lions Optimal Control of Systems Governed by Partial Differential Equations , 1971 .

[14]  R. Glowinski,et al.  Exact and approximate controllability for distributed parameter systems , 1995, Acta Numerica.

[15]  Philippe G. Ciarlet,et al.  The finite element method for elliptic problems , 2002, Classics in applied mathematics.

[16]  Dan S. Henningson,et al.  Linear and Nonlinear Optimal Control in Spatial Boundary Layers , 2002 .

[17]  I. Babuska Error-bounds for finite element method , 1971 .

[18]  Donald A. French,et al.  Approximation of an elliptic control problem by the finite element method , 1991 .