English

Lifting Commuting 3-Isometric Tuples

Functional Analysis 2015-08-07 v1

Abstract

An operator TT is called a 3-isometry if there exists operators B1(T,T)B_1(T^*,T) and B2(T,T)B_2(T^*,T) such that Q(n)=TnTn=1+nB1(T,T)+n2B2(T,T)Q(n)=T^{*n}T^n=1+nB_1(T^*,T)+n^2 B_2(T^*,T) for all natural numbers nn. An operator JJ is a Jordan operator of order 22 if J=U+NJ=U+N where UU is unitary, NN is nilpotent order 22, and UU and NN commute. An easy computation shows that JJ is a 33-isometry and that the restriction of JJ to an invariant subspace is also a 33-isometry. Those 33-isometries which are the restriction of a Jordan operator to an invariant subspace can be identified, using the theory of completely positive maps, in terms of a positivity condition on the operator pencil Q(s).Q(s). In this article, we establish the analogous result in the multi-variable setting and show, by modifying an example of Choi, that an additional hypothesis is necessary. Lastly we discuss the joint spectrum of sub-Jordan tuples and derive results for 3-symmetric operators as a corollary.

Keywords

Cite

@article{arxiv.1508.01273,
  title  = {Lifting Commuting 3-Isometric Tuples},
  author = {Benjamin Russo},
  journal= {arXiv preprint arXiv:1508.01273},
  year   = {2015}
}
R2 v1 2026-06-22T10:27:33.036Z