TY - JOUR
T1 - Homomesies on permutations -- an analysis of maps and statistics in the FindStat database
AU - Elder, Jennifer
AU - Lafrenière, Nadia
AU - McNicholas, Erin
AU - Striker, Jessica
AU - Welch, Amanda
PY - 2022/6/27
Y1 - 2022/6/27
N2 - In this paper, we perform a systematic study of permutation statistics and bijective maps on permutations in which we identify and prove 122 instances of the homomesy phenomenon. Homomesy occurs when the average value of a statistic is the same on each orbit of a given map. The maps we investigate include the Lehmer code rotation, the reverse, the complement, the Foata bijection, and the Kreweras complement. The statistics studied relate to familiar notions such as inversions, descents, and permutation patterns, and also more obscure constructs. Beside the many new homomesy results, we discuss our research method, in which we used SageMath to search the FindStat combinatorial statistics database to identify potential homomesies.
AB - In this paper, we perform a systematic study of permutation statistics and bijective maps on permutations in which we identify and prove 122 instances of the homomesy phenomenon. Homomesy occurs when the average value of a statistic is the same on each orbit of a given map. The maps we investigate include the Lehmer code rotation, the reverse, the complement, the Foata bijection, and the Kreweras complement. The statistics studied relate to familiar notions such as inversions, descents, and permutation patterns, and also more obscure constructs. Beside the many new homomesy results, we discuss our research method, in which we used SageMath to search the FindStat combinatorial statistics database to identify potential homomesies.
KW - math.CO
U2 - 10.1090/mcom/3866
DO - 10.1090/mcom/3866
M3 - Article
JO - Mathematics of Computation
JF - Mathematics of Computation
ER -