Add to ORKGPartitions wherein the even parts appear in two different colours are known as cubic partitions. Recently, Merca introduced and studied the function $A(n)$, which is defined as the difference between the number of cubic partitions of $n$ into an even number of parts and the number of cubic partitions of $n$ into an odd number of parts. In particular, using Smoot's \textsf{RaduRK} Mathematica package, Merca proved the following congruences by finding the exact generating functions of the respective functions. For all $n\ge0$, \begin{align*}A(9n+5)\equiv 0\pmod 3,\\ A(27n+26)\equiv 0\pmod 3. \end{align*} By using generating function manipulations and dissections, da Silva and Sellers proved these congruences and two infinite families of congr...
In this paper, we establish infinite families of congruences in consecutive arithmetic progressions ...
By means of the multi-section series method, six congruence relations and their corresponding genera...
AbstractIn this paper the following theorem is proved and generalized. The partitions of any positiv...
Recently, Andrews and Merca have given a new combinatorial interpretation of the total number of eve...
AbstractUsing elementary methods, we establish several new Ramanujan type identities and congruences...
Let p_r(n) denote the difference between the number of r-colored partitions of n into an even number...
Let p_r(n) denote the difference between the number of r-colored partitions of n into an even number...
AbstractThe goal of this paper is to prove new congruences involving 2-colored and 3-colored general...
We find several interesting congruences modulo $3$ for $5$-core partitions and two color partitions
Recently, Andrews, Dixit and Yee introduced partition functions associated with Ramanujan/Watson thi...
In recent work, Bringmann et al. used q-difference equations to compute a two-variable q-hypergeomet...
AbstractAlthough much is known about the partition function, little is known about its parity. For t...
Let b3,5(n) denote the number of partitions of n into parts that are not multiples of 3 or 5. We est...
AbstractThe partition function P(n) satisfy some congruence properties. Eichhorn and Ono prove the e...
In this paper, we establish infinite families of congruences in consecutive arithmetic progressions ...
In this paper, we establish infinite families of congruences in consecutive arithmetic progressions ...
By means of the multi-section series method, six congruence relations and their corresponding genera...
AbstractIn this paper the following theorem is proved and generalized. The partitions of any positiv...
Recently, Andrews and Merca have given a new combinatorial interpretation of the total number of eve...
AbstractUsing elementary methods, we establish several new Ramanujan type identities and congruences...
Let p_r(n) denote the difference between the number of r-colored partitions of n into an even number...
Let p_r(n) denote the difference between the number of r-colored partitions of n into an even number...
AbstractThe goal of this paper is to prove new congruences involving 2-colored and 3-colored general...
We find several interesting congruences modulo $3$ for $5$-core partitions and two color partitions
Recently, Andrews, Dixit and Yee introduced partition functions associated with Ramanujan/Watson thi...
In recent work, Bringmann et al. used q-difference equations to compute a two-variable q-hypergeomet...
AbstractAlthough much is known about the partition function, little is known about its parity. For t...
Let b3,5(n) denote the number of partitions of n into parts that are not multiples of 3 or 5. We est...
AbstractThe partition function P(n) satisfy some congruence properties. Eichhorn and Ono prove the e...
In this paper, we establish infinite families of congruences in consecutive arithmetic progressions ...
In this paper, we establish infinite families of congruences in consecutive arithmetic progressions ...
By means of the multi-section series method, six congruence relations and their corresponding genera...
AbstractIn this paper the following theorem is proved and generalized. The partitions of any positiv...