Bhattacharjee, Nil and Das, Sabuj and Mohajan, Haradhan (2014): Andrews-Garvan-Liang’s Spt-crank for Marked Overpartitions. Published in: International Journal of Applied Science-Research and Review , Vol. 1, No. 1 (30 October 2014): pp. 71-81.
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Abstract
In 2009, Bingmann, Lovejoy and Osburn have shown the generating function for spt2(n). In 2012, Andrews, Garvan, and Liang have defined the sptcrank in terms of partition pairs. In this article the number of smallest parts in the overpartitions of n with smallest part not overlined and even are discussed, and the vector partitions and S-partitions with 4 components, each a partition with certain restrictions are also discussed. The generating function for spt2(n), and the generating function for MS(m, n) are shown with a result in terms of modulo 3. This paper shows how to prove the Theorem 1, in terms of MS(m, n) with a numerical example, and shows how to prove the Theorem 2, with the help of sptcrank in terms of partition pairs. In 2014, Garvan and Jennings-Shaffer are capable to define the sptcrank for marked overpartitions. This paper also shows another result with the help of 15 SP2-partition pairs of 8 and shows how to prove the Corollary with the help of 15 marked overpartitions of 8.
| Item Type: | MPRA Paper |
|---|---|
| Original Title: | Andrews-Garvan-Liang’s Spt-crank for Marked Overpartitions |
| English Title: | Andrews-Garvan-Liang’s Spt-crank for Marked Overpartitions |
| Language: | English |
| Keywords: | crank, non-negative, overpartitions, overlined, sptcrank, weight |
| Subjects: | C - Mathematical and Quantitative Methods > C3 - Multiple or Simultaneous Equation Models ; Multiple Variables C - Mathematical and Quantitative Methods > C6 - Mathematical Methods ; Programming Models ; Mathematical and Simulation Modeling |
| Item ID: | 83047 |
| Depositing User: | Haradhan Kumar Mohajan |
| Date Deposited: | 29 Dec 2017 17:37 |
| Last Modified: | 20 Oct 2019 04:46 |
| References: | [1] Andrews, G.; Dyson, F. and Rhoades R., On the distribution of the spt-crank, Mathematics, 1(3): 76–88, 2013. [2] Andrews, G.E.; Garvan, F.G. and Liang, J., Combinatorial Interpretations of Congruences for the spt-function, The Ramanujan Journal, Springer. 29(1–3): 321–338, 2012. [3] Berkovich, A. and Garvan, F.G., K. Saito’s Conjecture for Nonnegative eta Products and Analogous Results for other Infinite Products, Journal of Number Theory, 128(6): 1731–1748, 2008. [4] Bringann, K.; Lovejoy, J. and Osburn, R., Rank and Crank Moments for Overpartitions, Journal of Number Theory, 129(7):1758–1772, 2009. [5] Bringann, K.; Lovejoy, J. and Osburn, R., Automorphic Properties of Generating Functions for Generalized Rank Moments and Durfee Symbols, Int. Math. Res. Not. IMRN, (2): 238–260, 2010. [6] Chen, W.Y.C.; Ji, K.Q. and Zang, W.J.T., The spt-crank for Ordinary Partitions, arXiv e-prints, Aug. 2013. [7] Garvan, F.G. and Shaffer, C.J., The spt-crank for Overpartitions, arXiv:1311.3680v2 [Math. NT], 23 Mar 2014. [8] Lovejoy, J. and Osburn, R., M2-rank Differences for Partitions without Repeated Odd Parts. J. Theor. Nombres Bordeaux, 21(2): 313–334, 2009. |
| URI: | https://mpra.ub.uni-muenchen.de/id/eprint/83047 |
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