English

Factorization, majorization, and domination for linear relations

Functional Analysis 2014-11-24 v1

Abstract

Let HA{\mathfrak H}_A, HB{\mathfrak H}_B, and H{\mathfrak H} be Hilbert spaces. Let AA be a linear relation from H{\mathfrak H} to HA{\mathfrak H}_A and let BB be a linear relation from H{\mathfrak H} to HB{\mathfrak H}_B. If there exists an operator ZB(HB,HA)Z \in \mathbf{B}({\mathfrak H}_B,{\mathfrak H}_A) such that ZBAZB \subset A, then BB is said to dominate AA. This notion plays a major role in the theory of Lebesgue type decompositions of linear relations and operators. There is a strong connection to the majorization and factorization in the well-known lemma of Douglas, when put in the context of linear relations. In this note some aspects of the lemma of Douglas are discussed in the context of linear relations and the connections with the notion of domination will be treated.

Cite

@article{arxiv.1411.5922,
  title  = {Factorization, majorization, and domination for linear relations},
  author = {Seppo Hassi and Henk de Snoo},
  journal= {arXiv preprint arXiv:1411.5922},
  year   = {2014}
}
R2 v1 2026-06-22T07:07:34.049Z