Universality of Weyl Unitaries

Abstract

Weyl's unitary matrices, which were introduced in Weyl's 1927 paper on group theory and quantum mechanics, are p× p unitary matrices given by the diagonal matrix whose entries are the p-th roots of unity and the cyclic shift matrix. Weyl's unitaries, which we denote by u and v, satisfy up= vp=1p (the p× p identity matrix) and the commutation relation u v=ζ v u, where ζ is a primitive p-th root of unity. We prove that Weyl's unitary matrices are universal in the following sense: if u and v are any d× d unitary matrices such that up= vp=1d and u v=ζ vu, then there exists a unital completely positive linear map φ: Mp( C)→ Md( C) such that φ( u)= u and φ( v)=v. We also show, moreover, that any two pairs of p-th order unitary matrices that satisfy the Weyl commutation relation are completely order equivalent. When p=2, the Weyl matrices are two of the three Pauli matrices from quantum mechanics. It was recently shown that g-tuples of Pauli-Weyl-Brauer unitaries are universal for all g-tuples of anticommuting selfadjoint unitary matrices; however, we show here that the analogous result fails for positive integers p>2. Finally, we show that the Weyl matrices are extremal in their matrix range, using recent ideas from noncommutative convexity theory.

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