A counterexample with convex domain to a conjecture of De Saint Venant

The Saint Venant's conjecture for convex plane domains f~, having symmetry about two orthogonal axes, is that the maximum of [Vu[ occurs only at the points on df~ which are nearest to the origin. G. Sweers constructed one such domain f~ and claimed that either the conjecture fails for f~ or for f~ =

Nevertheless, at present there is still a need to reduce the computational costs of a BEM. Moreover, the straight-In this paper an iterative domain decomposition method for the solution of Laplace's equation is described and its effectiveness in forward application of a BEM requires a computational

## Dendritic cells (DC) are the most potent antigen-presenting cells, and induce antigen-specific immune responses. Infiltration of tumors by DC is thought to reflect the interaction between the host immune system and tumor cells. Tumor-infiltrating DC (TIDC) are believed to evolve into tumor-anti