Boundary conditions for linear manifolds, I

The Euler equation and the Dehn᎐Sommerville equations are known to be the Ž . Ž only rational linear conditions for f-vectors number of simplices at various . dimensions of triangulations of spheres. We generalize this fact to arbitrary triangulations, linear triangulations of manifolds, and polytop

Many compressible flow and aeroacoustic computations rely on accurate nonreflecting or radiation boundary conditions. When the equations and boundary conditions are discretized using a finite-difference scheme, the dispersive nature of the discretized equations can lead to spurious numerical reflect

This paper is concerned with the dynamic process governed by the boundary value problem. We examine the situation with the appearance of singular controllers and formulate a second-order optimality criterion on the basis of the increment formula. We also show how to apply this criterion as a verifyi