Pariah moonshine

Classifying groups is an important challenge in mathematics and has led to the identification of groups which do not belong to the main families. Here Duncan et al. introduce a type of moonshine which is a connection between these groups, number theory and potentially physics.

Bibliographic Details
Main Authors: John F. R. Duncan, Michael H. Mertens, Ken Ono
Format: Article
Language:English
Published: Nature Publishing Group 2017-09-01
Series:Nature Communications
Online Access:https://doi.org/10.1038/s41467-017-00660-y
id doaj-f96097cdf5904bf48c9d85490883300a
record_format Article
spelling doaj-f96097cdf5904bf48c9d85490883300a2021-05-11T07:26:06ZengNature Publishing GroupNature Communications2041-17232017-09-01811510.1038/s41467-017-00660-yPariah moonshineJohn F. R. Duncan0Michael H. Mertens1Ken Ono2Department of Mathematics and Computer Science, Emory UniversityMathematisches Institut der Universität zu KölnDepartment of Mathematics and Computer Science, Emory UniversityClassifying groups is an important challenge in mathematics and has led to the identification of groups which do not belong to the main families. Here Duncan et al. introduce a type of moonshine which is a connection between these groups, number theory and potentially physics.https://doi.org/10.1038/s41467-017-00660-y
collection DOAJ
language English
format Article
sources DOAJ
author John F. R. Duncan
Michael H. Mertens
Ken Ono
spellingShingle John F. R. Duncan
Michael H. Mertens
Ken Ono
Pariah moonshine
Nature Communications
author_facet John F. R. Duncan
Michael H. Mertens
Ken Ono
author_sort John F. R. Duncan
title Pariah moonshine
title_short Pariah moonshine
title_full Pariah moonshine
title_fullStr Pariah moonshine
title_full_unstemmed Pariah moonshine
title_sort pariah moonshine
publisher Nature Publishing Group
series Nature Communications
issn 2041-1723
publishDate 2017-09-01
description Classifying groups is an important challenge in mathematics and has led to the identification of groups which do not belong to the main families. Here Duncan et al. introduce a type of moonshine which is a connection between these groups, number theory and potentially physics.
url https://doi.org/10.1038/s41467-017-00660-y
work_keys_str_mv AT johnfrduncan pariahmoonshine
AT michaelhmertens pariahmoonshine
AT kenono pariahmoonshine
_version_ 1721452311121756160