Add to ORKGAbstract. We study two types of crank moments and two types of rank moments for overpartitions. We show that the crank moments and their derivatives, along with certain linear combinations of the rank moments and their derivatives, can be written in terms of quasimodular forms. We then use this fact to prove exact relations involving the moments as well as congruence properties modulo 3, 5, and 7 for some combinatorial functions which may be expressed in terms of the second moments. Finally, we establish a congruence modulo 3 involving one such combinatorial function and the Hurwitz class number H(n). 1
Abstract. We define two-parameter generalizations of two combinatorial constructions of Andrews: the...
Abstract. Andrews recently introduced k-marked Durfee symbols, which are a generalization of partiti...
Asymptotic formulas for the positive moments of rank and crank of partitions were obtained by K. Bri...
AbstractWe study two types of crank moments and two types of rank moments for overpartitions. We sho...
We study two types of crank moments and two types of rank moments for overpartitions. We show that t...
In 2003, Atkin and Garvan initiated the study of rank and crank moments for ordinary partitions. The...
In 2003, Atkin and Garvan initiated the study of rank and crank moments for ordinary partitions. The...
Abstract. In recent work, Andrews, Chan, and Kim extend a result of Gar-van about even rank and cran...
AbstractIn this paper, we modify the standard definition of moments of ranks and cranks such that od...
Abstract. Higher moments of the partition rank and crank statistics have been studied for their conn...
Higher moments of the partition rank and crank statistics have been studied for their connections to...
In this paper, we modify the standard definition of moments of ranks and cranks such that odd moment...
AbstractAndrewsʼ spt-function can be written as the difference between the second symmetrized crank ...
Graduation date: 2017We generalize overpartition rank and crank generating functions to obtain k-fo...
We define two-parameter generalizations of two combinatorial constructions of Andrews: the kth symme...
Abstract. We define two-parameter generalizations of two combinatorial constructions of Andrews: the...
Abstract. Andrews recently introduced k-marked Durfee symbols, which are a generalization of partiti...
Asymptotic formulas for the positive moments of rank and crank of partitions were obtained by K. Bri...
AbstractWe study two types of crank moments and two types of rank moments for overpartitions. We sho...
We study two types of crank moments and two types of rank moments for overpartitions. We show that t...
In 2003, Atkin and Garvan initiated the study of rank and crank moments for ordinary partitions. The...
In 2003, Atkin and Garvan initiated the study of rank and crank moments for ordinary partitions. The...
Abstract. In recent work, Andrews, Chan, and Kim extend a result of Gar-van about even rank and cran...
AbstractIn this paper, we modify the standard definition of moments of ranks and cranks such that od...
Abstract. Higher moments of the partition rank and crank statistics have been studied for their conn...
Higher moments of the partition rank and crank statistics have been studied for their connections to...
In this paper, we modify the standard definition of moments of ranks and cranks such that odd moment...
AbstractAndrewsʼ spt-function can be written as the difference between the second symmetrized crank ...
Graduation date: 2017We generalize overpartition rank and crank generating functions to obtain k-fo...
We define two-parameter generalizations of two combinatorial constructions of Andrews: the kth symme...
Abstract. We define two-parameter generalizations of two combinatorial constructions of Andrews: the...
Abstract. Andrews recently introduced k-marked Durfee symbols, which are a generalization of partiti...
Asymptotic formulas for the positive moments of rank and crank of partitions were obtained by K. Bri...