Bowditch introduced the notion of diffuse groups as a geometric variation of
the unique product property. We elaborate on various examples and non-examples,
keeping the geometric point of view from Bowditch's paper. In particular, we
discuss fundamental groups of flat and hyperbolic manifolds. The appendix
settles an open question by providing an example of a group which is diffuse
but not left-orderable.Comment: 37 pages, main text by Kionke and Raimbault, appendix by Dunfield. v2
: updated ancillary files and added url to the reference