Invariant Maximal Positive Subspaces and Polar Decompositions

Let X be a complex infinite dimensional Banach space. An operator L on X is called of subcritical class, if n=1 n &3Â2 log + &L n &< . Assume that T is an operator on X whose iterates have norms of polynomial growth. We prove that if T has a range of finite codimension and a left inverse of subcriti

In this paper positive real matrices in indefinite inner product spaces are studied. This class of matrices is intimately connected to dissipative matrices in the complex case. First the complex case and then the real case are treated. An explicit construction is given for invariant semidefinite sub

By considering the eigenvalue problem as a system of nonlinear equations, it is possible to develop a number of solution schemes which are related to the Newton iteration. For example, to compute eigenvalues and eigenvectors of an n • n matrix A, the Davidson and the Jacobi-Davidson techniques, cons