Indefinite Inner Product Space - Properties and Applications

Properties and Applications

Krein spaces arise naturally in situations where the indefinite inner product has an analytically useful property (such as Lorentz invariance) which the Hilbert inner product lacks. It is also common for one of the two inner products, usually the indefinite one, to be globally defined on a manifold and the other to be coordinate-dependent and therefore defined only on a local section.

In many applications the positive semi-definite inner product depends on the chosen fundamental decomposition, which is, in general, not unique. But it may be demonstrated (e. g., cf. Proposition 1.1 and 1.2 in the paper of H. Langer below) that any two metric operators and compatible with the same indefinite inner product on result in Hilbert spaces and whose decompositions and have equal dimensions. Although the Hilbert inner products on these quotient spaces do not generally coincide, they induce identical square norms, in the sense that the square norms of the equivalence classes and into which a given falls are equal. All topological notions in a Krein space, like continuity, closed-ness of sets, and the spectrum of an operator on, are understood with respect to this Hilbert space topology.