Classification and dilation for q-commuting 2 × 2 scalar matrices
Abstract
A tuple T=(T1, …c, Tk) of operators on a Hilbert space H is said to be q-commuting with \|q\|=1 or simply q-commuting if there is a family of scalars q=\qij ∈ C : |qij|=1, \ qij=qji-1, \ 1 ≤ i < j ≤ k \ such that Ti Tj =qijTj Ti for 1 ≤ i < j ≤ k. Moreover, if each qij=-1, then T is called an anti-commuting tuple. A well-known result due to Holbrook Holbrook states that a commuting k-tuple consisting of 2 × 2 scalar matrix contractions always dilates to a commuting k-tuple of unitaries for any k≥ 1. To find a generalization of this result for a q-commuting k-tuple of 2× 2 scalar matrix contractions, we first classify such tuples into three types upto similarity. Then we prove that a q-commuting tuple which is unitarily equivalent to any of these three types, admits a q-unitary dilation, where q ⊂eq q \1\. A special emphasis is given to the dilation of an anti-commuting tuple of 2 × 2 scalar matrix contractions.
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