Add to ORKGWe study new classes of overpartitions of numbers based on the properties of non-overlined parts. Several combinatorial identities are established by means of generating functions and bijective proofs. We show that our enumeration function satisfies a pair of infinite Ramanujantype congruences modulo 3. Lastly, by conditioning on the overlined parts of overpartitions,we give a seemingly new identity between the number of overpartitions and a certain class of ordinary partition functions. A bijective proof for this theorem also includes a partial answer to a previous request for a bijection on partitions doubly restricted by divisibility and frequency
Neste trabalho apresentaremos novas provas bijetivas para identidades relacionadas a partições em pa...
2Abstract. Eighty years ago, Ramanujan conjectured and proved some striking con-gruences for the par...
A partition of a nonnegative integer is a way of writing this number as a sum of positive integers w...
We study new classes of overpartitions of numbers based on the properties of non-overlined parts. Se...
We prove two identities related to overpartition pairs. One of them gives a generalization of an ide...
AbstractWe prove two identities related to overpartition pairs. One of them gives a generalization o...
In this article, we consider various arithmetic properties of the function po(n) which denotes the n...
The study of Ramanujan-type congruences for functions specific to additive number theory has a long ...
In a recent work, Andrews defined the combinatorial objects called singular overpartitions denoted b...
Recently, Lovejoy introduced the construct of overpartition pairs which are a natural generalization...
AbstractWe study the number of partitions of n into k different parts by constructing a generating f...
The theory of integer partitions is a field of much investigative interest to mathematicians and phy...
Integer partitions play important roles in diverse areas of mathematics such as q-series, the theory...
In 1916, Ramanujan’s showed the spt-crank for marked overpartitions. The corresponding special funct...
A thesis submitted to the Faculty of Science, University of the Witwatersrand, Johannesburg, in ful...
Neste trabalho apresentaremos novas provas bijetivas para identidades relacionadas a partições em pa...
2Abstract. Eighty years ago, Ramanujan conjectured and proved some striking con-gruences for the par...
A partition of a nonnegative integer is a way of writing this number as a sum of positive integers w...
We study new classes of overpartitions of numbers based on the properties of non-overlined parts. Se...
We prove two identities related to overpartition pairs. One of them gives a generalization of an ide...
AbstractWe prove two identities related to overpartition pairs. One of them gives a generalization o...
In this article, we consider various arithmetic properties of the function po(n) which denotes the n...
The study of Ramanujan-type congruences for functions specific to additive number theory has a long ...
In a recent work, Andrews defined the combinatorial objects called singular overpartitions denoted b...
Recently, Lovejoy introduced the construct of overpartition pairs which are a natural generalization...
AbstractWe study the number of partitions of n into k different parts by constructing a generating f...
The theory of integer partitions is a field of much investigative interest to mathematicians and phy...
Integer partitions play important roles in diverse areas of mathematics such as q-series, the theory...
In 1916, Ramanujan’s showed the spt-crank for marked overpartitions. The corresponding special funct...
A thesis submitted to the Faculty of Science, University of the Witwatersrand, Johannesburg, in ful...
Neste trabalho apresentaremos novas provas bijetivas para identidades relacionadas a partições em pa...
2Abstract. Eighty years ago, Ramanujan conjectured and proved some striking con-gruences for the par...
A partition of a nonnegative integer is a way of writing this number as a sum of positive integers w...