@article{tjant2014265,
author={Tamba, Manvendra},
title={Note on a Partition Function Which Assumes All Integral Values},
journal={Turkish Journal of Analysis and Number Theory},
volume={2},
number={6},
pages={220--222},
year={2014},
url={http://pubs.sciepub.com/tjant/2/6/5},
abstract={Let <i>G</i>(<i>n</i>) denote the number of partitions of <i>n</i> into distinct parts which are of the form 2<i>m</i>, 3<i>m</i>, 5<i>m</i>, 6<i>m</i>-3, 8<i>m</i>-3, 9<i>m</i>-3 or 11<i>m</i>-3 with parts of the form 2<i>m</i>, 3<i>m</i>, 6<i>m</i>-3, or 11<i>m</i>-3 being even in number minus the number of them with parts of the form 2<i>m</i>, 3<i>m</i>, 6<i>m</i>-3, or 11<i>m</i>-3 being odd in number. In this paper, we prove that <i>G</i>(<i>n</i>) assumes all integral values and does so infinitely often.},
doi={10.12691/tjant-2-6-5}
publisher={Science and Education Publishing}
}