@article{7808f9c5e02a41baba48f27f82845d73,
title = "Symmetric group representations and Z",
abstract = "We discuss implications of the following statement about representation theory of symmetric groups: every integer appears infinitely often as an irreducible character evaluation and every nonnegative integer appears infinitely often as a Littlewood–Richardson coefficient and as a Kronecker coefficient.",
author = "Anshul Adve and Alexander Yong",
note = "We thank Ezra Miller and Bernd Sturmfels for stimulating remarks (over a dozen years ago) concerning [8,3] . We are grateful to Alexander Miller for having suggested the character evaluation argument, for data, as well as many other helpful comments. We thank Nantel Bergeron, Colleen Robichaux, Hugh Thomas, and Mike Zabrocki for informative discussions. AY was partially supported by the NSF grant DMS 1500691 .",
year = "2018",
month = jan,
doi = "10.1016/j.crma.2017.11.009",
language = "English (US)",
volume = "356",
pages = "1--4",
journal = "Comptes Rendus Mathematique",
issn = "1631-073X",
publisher = "Academie des sciences",
number = "1",
}