Eigenvalue upper bounds for the discretized Stokes operator

For bounded potentials which behave like &cx &# at infinity we investigate whether discrete eigenvalues of the radial Dirac operator H } accumulate at +1 or not. It is well known that #=2 is the critical exponent. We show that c=1Â8+ }(}+1)Â2 is the critical coupling constant in the case #=2. Our ap

The use of mixed ®nite element methods in discretizing the Stokes equations leads to systems involving the so-called pressure matrix. Some new spectral properties of this important matrix are here presented for the Q 1 -P 0 element.

In this paper some iterative solution methods of the GMRES type for the discretized Navier-Stokes equations are treated. The discretization combined with a pressure correction scheme leads to two different types of systems of linear equations: the momentum system and the pressure system. These syste