TY - JOUR
T1 - Large schröder paths by types and symmetric functions
AU - An, Su Hyung
AU - Eu, Sen Peng
AU - Kim, Sangwook
PY - 2014
Y1 - 2014
N2 - In this paper we provide three results involving large Schröder paths. First, we enumerate the number of large Schröder paths by type. Second, we prove that these numbers are the coefficients of a certain symmetric function defined on the staircase skew shape when expanded in elementary symmetric functions. Finally we define a symmetric function on a Fuss path associated with its low valleys and prove that when expanded in elementary symmetric functions the indices are running over the types of all Schröder paths. These results extend their counterparts of Kreweras and Armstrong-Eu on Dyck paths respectively.
AB - In this paper we provide three results involving large Schröder paths. First, we enumerate the number of large Schröder paths by type. Second, we prove that these numbers are the coefficients of a certain symmetric function defined on the staircase skew shape when expanded in elementary symmetric functions. Finally we define a symmetric function on a Fuss path associated with its low valleys and prove that when expanded in elementary symmetric functions the indices are running over the types of all Schröder paths. These results extend their counterparts of Kreweras and Armstrong-Eu on Dyck paths respectively.
KW - Elementary symmetric functions
KW - Partial horizontal strips
KW - Schröder paths
KW - Sparse noncrossing partitions
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U2 - 10.4134/BKMS.2014.51.4.1229
DO - 10.4134/BKMS.2014.51.4.1229
M3 - Article
AN - SCOPUS:84905639611
SN - 1015-8634
VL - 51
SP - 1229
EP - 1240
JO - Bulletin of the Korean Mathematical Society
JF - Bulletin of the Korean Mathematical Society
IS - 4
ER -