On a quasi-regular Lagrange problem

It is shown that under certain conditions the regularization of a pair of regular incidence polytopes is not itself an incidence polytope. Thus there exist regular incidence quasipolytopes which are not incidence polytopes.

It is proved th2t if a graph G has at least cn log n vertices, then either G or its complement G contains a subgraph H with a t least n vertices and minimum degree a t least 1 V ( H ) I /2. This result is not far from being best possible, as is shown by a rather unusual random construction. Some rel

In this paper, we consider the Cauchy problem for the Helmholtz equation in a rectangle, where the Cauchy data is given for y = 0 and boundary data are for x = 0 and x = π. The solution is sought in the interval 0 < y ≤ 1. A quasi-reversibility method is applied to formulate regularized solutions wh