@article {
author = {Choi, Yemon},
title = {A gap theorem for the ZL-amenability constant of a finite group},
journal = {International Journal of Group Theory},
volume = {5},
number = {4},
pages = {27-46},
year = {2016},
publisher = {University of Isfahan},
issn = {2251-7650},
eissn = {2251-7669},
doi = {10.22108/ijgt.2016.9562},
abstract = {It was shown in [A. Azimifard, E. Samei and N. Spronk, Amenability properties of the centres of group algebras, J. Funct. Anal., 256 no. 5 (2009) 1544-1564.] that the ZL-amenability constant of a finite group is always at least $1$, with equality if and only if the group is abelian. It was also shown that for any finite non-abelian group this invariant is at least $301/300$, but the proof relies crucially on a deep result of D. A. Rider on norms of central idempotents in group algebras. Here we show that if $G$ is finite and non-abelian then its ZL-amenability constant is at least $7/4$, which is known to be best possible. We avoid use of Rider's reslt, by analyzing the cases where $G$ is just non-abelian, using calculations from [M. Alaghmandan, Y. Choi and E. Samei, ZL-amenability constants of finite groups with two character degrees, Canad. Math. Bull., 57 (2014) 449-462.], and establishing a new estimate for groups with trivial centre.},
keywords = {Amenability constant,character degrees,just non-abelian groups},
url = {https://ijgt.ui.ac.ir/article_9562.html},
eprint = {https://ijgt.ui.ac.ir/article_9562_6ce2f0b168ba2560656bbdd6cd54eaae.pdf}
}