Regular Dilation on Graph Products of N
Abstract
We extended the definition of regular dilation to graph products of N, which is an important class of quasi-lattice ordered semigroups. Two important results in dilation theory are unified under our result: namely, Brehmer's regular dilation on Nk and Frazho-Bunce-Popescu's dilation of row contractions. We further show that a representation of a graph product has an isometric Nica-covariant dilation if and only if it is -regular. A special case of our result was considered by Popescu, and we studied the connection with Popescu's work.
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