English

An operator inequality for range projections

Operator Algebras 2018-06-19 v2 Functional Analysis

Abstract

By a result of Lundquist-Barrett, it follows that the rank of a positive semi-definite matrix is less than or equal to the sum of the ranks of its principal diagonal submatrices when written in block form. In this article, we take a general operator algebraic approach which provides insight as to why the above rank inequality resembles the Hadamard-Fischer determinant inequality in form, with multiplication replaced by addition. It also helps in identifying the necessary and sufficient conditions under which equality holds. Let R\mathscr{R} be a von Neumann algebra, and Φ\Phi be a normal conditional expectation from R\mathscr{R} onto a von Neumann subalgebra S\mathscr{S} of R\mathscr{R}. Let R[T]\mathfrak{R}[T] denote the range projection of an operator TT. For a positive operator AA in R\mathscr{R}, we prove that Φ(R[A])R[Φ(A)]\Phi(\mathfrak{R}[A]) \le \mathfrak{R}[\Phi(A)] with equality if and only if R[A]S\mathfrak{R}[A] \in \mathscr{S}.

Keywords

Cite

@article{arxiv.1804.09683,
  title  = {An operator inequality for range projections},
  author = {Soumyashant Nayak},
  journal= {arXiv preprint arXiv:1804.09683},
  year   = {2018}
}

Comments

5 pages. corrected hypothesis of Theorem 2.1 (Jensen' operator inequality) - `unital' completely positive map

R2 v1 2026-06-23T01:35:43.531Z