Cone complementarity problems with finite solution sets

We investigate conditions on a square matrix M for which every LCP(M, y 1 (with q arbitrary) has a connected solution set. We show that a matrix with this property is necessarily fully semimonotone. Using degree theory, we show that the solution set of LCP(M, q) corresponding to a P,-matrix is conn

We propose a new second-order cone linear complementarity problem (SOCLCP) formulation for the numerical finite element analysis of three-dimensional (3D) frictional contact problems by the parametric variational principle. Specifically, we develop a regularization technique to resolve the multi-val

A new finite element solution method for the analysis of frictional contact problems is presented. The contact problem is solved by imposing geometric constraints on the pseudo equilibrium configuration, defined as a configuration at which the compatibility conditions are violated. The algorithm doe