On Positive Vectors in Indefinite Inner Product Spaces

Abstract

Let H be a linear space equipped with an indefinite inner product [·, ·]. Denote by F++=\f∈H \ : \ [f,f]>0\ the nonlinear set of positive vectors in H. We demonstrate that the properties of a linear operator W in H can be uniquely determined by its restriction to F++. In particular, we prove that the bijectivity of W on F++ is equivalent to W being close to a unitary operator with respect to [·, ·]. Furthermore, we consider a one-parameter semi-group of operators W+ = \W(t) : t ≥ 0\, where each W(t) maps F++ onto itself in a one-to-one manner. We show that, under this natural restriction, the semi-group W+ can be transformed into a one-parameter group U = \U(t) : t∈R\ of operators that are unitary with respect to [·, ·]. By imposing additional conditions, we show how to construct a suitable definite inner product ·, ·, based on [·, ·], which guarantees the unitarity of the operators U(t) in the Hilbert space obtained by completing H with respect to ·, ·.

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