Every expansive m -concave operator has m -isometric dilation
Abstract
The aim of this paper is to obtain m -isometric dilation of expansive m -concave operator on Hilbert space. The obtained dilation is shown to be minimal. The matrix representation of this dilation is given. It is also proved that in case of 3-concave operators the assumption on expansivity is not necessary. The paper contains an example showing that minimal m -isometric dilations may not be isomorphic.
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