Three-level BDDC in two dimensions

This paper concerns the problem of pose estimation, in particular the application of linear and nonlinear methods to the case of anisotropic error distributions. Incremental and batch techniques are discussed, and a linear solution to the two dimensional problem is developed by reference to the nois

We discuss the weighted minimum number polygonal approximation problem. Eu and Toussaint (1994, CVGIP: Graphical Models Image Process. 56, 231-246) considered this problem subject to the parallel-strip error criterion in R 2 with L q distance metrics, and they concluded that it can be solved in O(n

Two ways to speed up N-body simulations of planet formation are (i) to confine motion to 2 spatial dimensions, or (ii) to artificially enhance the physical radii of the bodies. These short cuts have the same effect of increasing the collision probability between objects. Here, I compare the results

The level set method was originally designed for problems dealing with codimension one objects, where it has been extremely succesful, especially when topological changes in the interface, i.e., merging and breaking, occur. Attempts have been made to modify it to handle objects of higher codimension