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On the parity of generalized partition functions III

Number Theory 2008-10-23 v1
Authors: Fethi Ben Said , Jean-Louis Nicolas , Ahlem Zekraoui
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Abstract

Improving on some results of J.-L. Nicolas \cite {Ndeb}, the elements of the set A=A(1+z+z3+z4+z5){\cal A}={\cal A}(1+z+z^3+z^4+z^5), for which the partition function p(A,n)p({\cal A},n) (i.e. the number of partitions of nn with parts in A{\cal A}) is even for all n6n\geq 6 are determined. An asymptotic estimate to the counting function of this set is also given.

Keywords

partition theory partition congruences

Cite

@article{arxiv.0810.4017,
  title  = {On the parity of generalized partition functions III},
  author = {Fethi Ben Said and Jean-Louis Nicolas and Ahlem Zekraoui},
  journal= {arXiv preprint arXiv:0810.4017},
  year   = {2008}
}

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