Add to ORKGLet spt (n) denote the total number of appearances of the smallest part in each partition of n. In 1988, Garvan gave new combinatorial interpretations of Ramanujan’s partition congruences mod 5, 7 and 11 in terms of a crank for weighted vector partitions. This paper shows how to generate the generating functions for spt(n), elaborately and also shows how to prove the relation among the terms spt (n) and. In 2008, Andrews stated Ramanujan- type congruences for the spt- function mod 5, 7 and 13. The new combinatorial interpretations of the spt- congruences mod 5 and 7 are given in this article. These are in terms of the spt- crank but for a restricted set of vector partitions. The proofs depend on relating the spt- crank with the crank of ve...
AbstractIn 1994, James Sellers conjectured an infinite family of Ramanujan type congruences for 2-co...
The study into specific properties of the partition function has been a rich topic for number theori...
∗ Corresponding author. Abstract: In this paper, we generalize a few important results in Integer Pa...
Let spt(n) denote the total number of appearances of the smallest parts in all the partitions of n. ...
Let spt(n) denote the total number of appearances of the smallest parts in all the partitions of n. ...
In 1916, Ramanujan’s showed the spt-crank for marked overpartitions. The corresponding special funct...
Let spt(n) denote the total number of appearances of the smallest parts in all the partitions of n. ...
In 1944, Freeman Dyson conjectured the existence of a “crank” function for partitions that would pro...
Andrews, Garvan and Liang introduced the spt-crank for vector partitions. We conjecture that for any...
In 2013, Andrews, Garvan and Liang defined Self-conjugate S-partitions. In 2011, Andrews stated the ...
2Abstract. Eighty years ago, Ramanujan conjectured and proved some striking con-gruences for the par...
AbstractThe discovery of some partition function congruences by Ramanujan, and subsequent research m...
A partition of a positive integer n is any non-increasing sequence of positive integers whose sum is...
AbstractThe ‘crank’ is a partition statistic which originally arose to give combinatorial interpreta...
This thesis focuses on the rank statistic of partition functions, congruences and relating identitie...
AbstractIn 1994, James Sellers conjectured an infinite family of Ramanujan type congruences for 2-co...
The study into specific properties of the partition function has been a rich topic for number theori...
∗ Corresponding author. Abstract: In this paper, we generalize a few important results in Integer Pa...
Let spt(n) denote the total number of appearances of the smallest parts in all the partitions of n. ...
Let spt(n) denote the total number of appearances of the smallest parts in all the partitions of n. ...
In 1916, Ramanujan’s showed the spt-crank for marked overpartitions. The corresponding special funct...
Let spt(n) denote the total number of appearances of the smallest parts in all the partitions of n. ...
In 1944, Freeman Dyson conjectured the existence of a “crank” function for partitions that would pro...
Andrews, Garvan and Liang introduced the spt-crank for vector partitions. We conjecture that for any...
In 2013, Andrews, Garvan and Liang defined Self-conjugate S-partitions. In 2011, Andrews stated the ...
2Abstract. Eighty years ago, Ramanujan conjectured and proved some striking con-gruences for the par...
AbstractThe discovery of some partition function congruences by Ramanujan, and subsequent research m...
A partition of a positive integer n is any non-increasing sequence of positive integers whose sum is...
AbstractThe ‘crank’ is a partition statistic which originally arose to give combinatorial interpreta...
This thesis focuses on the rank statistic of partition functions, congruences and relating identitie...
AbstractIn 1994, James Sellers conjectured an infinite family of Ramanujan type congruences for 2-co...
The study into specific properties of the partition function has been a rich topic for number theori...
∗ Corresponding author. Abstract: In this paper, we generalize a few important results in Integer Pa...