differential-operators issueshttps://zivgitlab.uni-muenster.de/j_bant01/differential-operators/-/issues2020-06-04T22:31:38+02:00https://zivgitlab.uni-muenster.de/j_bant01/differential-operators/-/issues/8Example for unboundedness of diffops2020-06-04T22:31:38+02:00Jannes Bantjej.bantje@wwu.deExample for unboundedness of diffopshttps://zivgitlab.uni-muenster.de/j_bant01/differential-operators/-/issues/7Resolve Homotopy invariance confusion2020-05-18T16:27:15+02:00Jannes Bantjej.bantje@wwu.deResolve Homotopy invariance confusionI probably got this wrong, but it seemed, as if HR use the Roe algebra to define K-homology, which seems wrong…I probably got this wrong, but it seemed, as if HR use the Roe algebra to define K-homology, which seems wrong…https://zivgitlab.uni-muenster.de/j_bant01/differential-operators/-/issues/5Paper von Rudi lesen2020-05-08T13:16:14+02:00Jannes Bantjej.bantje@wwu.dePaper von Rudi lesenund auch ganz kurz einarbeiten in das Dokumentund auch ganz kurz einarbeiten in das Dokumenthttps://zivgitlab.uni-muenster.de/j_bant01/differential-operators/-/issues/2Read Higson-Roe paper2020-04-28T09:26:55+02:00Jannes Bantjej.bantje@wwu.deRead Higson-Roe paperThis one: *K-Homology, Assembly and Rigidity Theorems for Relative Eta Invariants*
To be found here: http://www.personal.psu.edu/ndh2/math/Papers_files/Higson,%20Roe%20-%202008%20-%20K-homology,%20assembly%20and%20rigidity%20theorems%2...This one: *K-Homology, Assembly and Rigidity Theorems for Relative Eta Invariants*
To be found here: http://www.personal.psu.edu/ndh2/math/Papers_files/Higson,%20Roe%20-%202008%20-%20K-homology,%20assembly%20and%20rigidity%20theorems%20for%20relative%20eta-invariants.pdf
Some notes on this seem appropiate