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Kadison's Pythagorean Theorem and essential codimension

Victor Kaftal
Mathematical Sciences
University of Cincinnati
victor.kaftal@uc.edu

Jireh Loreaux
Mathematics and Statistics
Southern Illinois University Edwardsville
jloreau@siue.edu

Submitted: 19 September 2016

Accepted: 3 March 2017

Revised: 7 March 2017

ColophonColophon

Edition: Accepted, post peer-reviewed manuscript, prior to copyediting

Website: Integral Equations and Operator Theory

Website: arXiv

©2017  Springer International Publishing

Kadison's Pythagorean theorem (2002) provides a characterization of the diagonals of projections with a subtle integrality condition. Arveson (2007), Kaftal, Ng, Zhang (2009), and Argerami (2015) all provide different proofs of that integrality condition. In this paper we interpret the integrality condition in terms of the essential codimension of a pair of projections introduced by Brown, Douglas and Fillmore (1973), or, equivalently of the index of a Fredholm pair of projections introduced by Avron, Seiler, and Simon (1994). The same techniques explain the integer occurring in the characterization of diagonals of selfadjoint operators with finite spectrum by Bownik and Jasper (2015).