The question of finite summability is one of importance for both K-homology and Spectral Triples. If a C*-algebra has uniformly finitely summable K-homology, we can compute the index pairing using Connes' Chern Character. In noncommutative geometry, a spectral triple represents a noncommutative manifold, and the summability of the triple provides a notion of dimension. The two notions are unified by the fact that the K-homology class associated to a finitely summable spectral triple has the same degree of summability as the spectral triple. In this expository talk, we define finite summability, discuss currently known examples, and outline potential avenues for research. No knowledge of K-homology or spectral triples will be assumed.
ASUERAU C*-Seminar
Sept. 21, 2022
WXLR A307 and virtual via Zoom
1:30-2:45pm MST/AZ
Our C*-Seminar will again be on Wednesdays from 1:30-2:45 pm (Arizona time, no daylight savings), meeting both in person (WXLR A307) and via zoom.
Also new: it's now the ASUERAU C*-Seminar (so, joint with our friends Lara and Mitch at Embry-Riddle Aeronautical University up the road in Prescott).
(Please email the organizer John Quigg quigg@asu.edu to be put on the email list if you would like to receive the link to the zoom seminar.)
Levi Lorenzo
PhD Candidate
University of Colorado Boulder