Sciweavers

DM
2008

New identities for 7-cores with prescribed BG-rank

14 years 18 days ago
New identities for 7-cores with prescribed BG-rank
Let be a partition. BG-rank() is defined as an alternating sum of parities of parts of [1]. In [2], Berkovich and Garvan found theta series representations for the t-core generating functions Pn0 at,j(n)qn. Here, at,j(n) denotes a number of t-cores of n with BG-rank = j. In addition, they found positive eta-quotient representations for odd t-core generating functions with extreme values of BG-rank. In this paper we discuss representations of this type for all 7-cores with prescribed BG-rank. We make an essential use of the Ramanujan modular equations of degree 7 [3] to prove a variety of new formulas for 7-core generating function Y j1 (1 - q7j)7 (1 - qj) . These formulas enable us to establish a number of striking inequalities for a7,j(n) with j = -1, 0, 1, 2 and a7(n), such as a7(2n + 2) 2a7(n), a7(4n + 6) 10a7(n). Here a7(n) denotes a number of unrestricted 7-cores of n. Our techniques are elementary and require creative imagination only. `Behind every inequality there lies an i...
Alexander Berkovich, Hamza Yesilyurt
Added 10 Dec 2010
Updated 10 Dec 2010
Type Journal
Year 2008
Where DM
Authors Alexander Berkovich, Hamza Yesilyurt
Comments (0)