### Non-isometric functional calculus for pairs of commuting contractions.

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Let (T1,…,TN) be an N-tuple of commuting contractions on a separable, complex, infinite-dimensional Hilbert space ℋ. We obtain the existence of a commuting N-tuple (V1,…,VN) of contractions on a superspace K of ℋ such that each ${V}_{j}$ extends ${T}_{j}$, j=1,…,N, and the N-tuple (V1,…,VN) has a decomposition similar to the Wold-von Neumann decomposition for coisometries (although the ${V}_{j}$ need not be coisometries). As an application, we obtain a new proof of a result of Słociński (see [9])

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