TY - JOUR
T1 - ON SIGNED MULTIPLICITIES OF SCHUR EXPANSIONS SURROUNDING PETRIE SYMMETRIC FUNCTIONS
AU - Cheng, Yen Jen
AU - Chou, Meng Chien
AU - Eu, Sen Peng
AU - Fu, Tung Shan
AU - Yao, Jyun Cheng
N1 - Funding Information:
Received by the editors June 28, 2022, and, in revised form, July 21, 2022, August 7, 2022, August 17, 2022, August 18, 2022, and August 20, 2022. 2020 Mathematics Subject Classification. Primary 05E05; Secondary 05A17. Key words and phrases. Petrie symmetric functions, truncated homogeneous symmetric functions, modular complete symmetric functions, signed multiplicity free. This research was supported in part by Ministry of Science and Technology (MOST), Taiwan, grants 110-2115-M-003-011-MY3 (the third author), 111-2115-M-153-004-MY2 (the fourth author), and MOST postdoctoral fellowship 111-2811-M-A49-537-MY2 (the first author).
Publisher Copyright:
©2023 American Mathematical Society.
PY - 2023/5/1
Y1 - 2023/5/1
N2 - For k ≥ 1, the homogeneous symmetric functions G(k, m) of degree m defined by Formula Presented are called Petrie symmetric functions. As derived by Grinberg and Fu–Mei independently, the expansion of G(k, m) in the basis of Schur functions sλ turns out to be signed multiplicity free, i.e., the coefficients are −1, 0 and 1. In this paper we give a combinatorial interpretation of the coefficient of sλ in terms of the k-core of λ and a sequence of rim hooks of size k removed from λ. We further study the product of G(k, m) with a power sum symmetric function pn. For all n ≥ 1, we give necessary and sufficient conditions on the parameters k and m in order for the expansion of G(k, m) · pn in the basis of Schur functions to be signed multiplicity free. This settles affirmatively a conjecture of Alexandersson as the special case n = 2.
AB - For k ≥ 1, the homogeneous symmetric functions G(k, m) of degree m defined by Formula Presented are called Petrie symmetric functions. As derived by Grinberg and Fu–Mei independently, the expansion of G(k, m) in the basis of Schur functions sλ turns out to be signed multiplicity free, i.e., the coefficients are −1, 0 and 1. In this paper we give a combinatorial interpretation of the coefficient of sλ in terms of the k-core of λ and a sequence of rim hooks of size k removed from λ. We further study the product of G(k, m) with a power sum symmetric function pn. For all n ≥ 1, we give necessary and sufficient conditions on the parameters k and m in order for the expansion of G(k, m) · pn in the basis of Schur functions to be signed multiplicity free. This settles affirmatively a conjecture of Alexandersson as the special case n = 2.
KW - Petrie symmetric functions
KW - modular complete symmetric functions
KW - signed multiplicity free
KW - truncated homogeneous symmetric functions
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U2 - 10.1090/proc/16263
DO - 10.1090/proc/16263
M3 - Article
AN - SCOPUS:85150054321
SN - 0002-9939
VL - 151
SP - 1839
EP - 1854
JO - Proceedings of the American Mathematical Society
JF - Proceedings of the American Mathematical Society
IS - 5
ER -