Hamburger Beitrage zur Angewandten Mathematik Beyond Montonicity in Regularization Methods for Nonlinear Complementarity Problems

Hamburger Beitrage zur Angewandten Mathematik An Asymptotic-Induced One-Dimensional Model to Describe Fires in Tunnels

Hamburger Beitrage zur Angewandten Mathematik Strictly Feasible Equation-Based Methods for Mixed Complementarity Problems

We introduce a new algorithm for the solution of the mixed complementarity problem (MCP) which has stronger properties than most existing methods. In fact, typical solution methods for the MCP either generate feasible iterates but have to solve relatively complicated subproblems (like quadratic programs or linear complementarity problems), or they have relatively simple subproblems (like linear...

Hamburger Beitrage zur Angewandten Mathematik Image Processing for Numerical Approximations of Conservation Laws: Nonlinear anisotropic arti cial dissipation

We employ a nonlinear anisotropic di usion operator like the ones used as a means of ltering and edge enhancement in image processing, in numerical methods for conservation laws. It turns out that algorithms currently used in image processing are very well suited for the design of nonlinear higher-order dissipative terms. In particular, we stabilize the well-known Lax-Wendro formula by means of...

Hamburger Beitrage zur Angewandten Mathematik An Active Set-type Newton Method for Constrained Nonlinear Systems

We consider the problem of nding a solution of a nonlinear system of equations subject to some box constraints. To this end, we introduce a new active set-type Newton method with global and local fast convergence properties. The method generates feasible iterates and has to solve only one linear system of equations at each iteration. Due to our active set strategy, this linear system is of redu...

Hamburger Beiträge zur Angewandten Mathematik Continuous Convergence of Relations - A Principle in Discretization Procedures