Improved Bounds for Two Query Adaptive Bitprobe Schemes Storing Five Elements
In this paper, we study two-bitprobe adaptive schemes storing five elements. For these class of schemes, the best known lower bound is m^{1/2} due to Alon and Feige [SODA 2009]. Recently, it was proved by Kesh [FSTTCS 2018] that two-bitprobe adaptive schemes storing three elements will take at least...
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Zusammenfassung: | In this paper, we study two-bitprobe adaptive schemes storing five elements.
For these class of schemes, the best known lower bound is m^{1/2} due to Alon
and Feige [SODA 2009]. Recently, it was proved by Kesh [FSTTCS 2018] that
two-bitprobe adaptive schemes storing three elements will take at least m^{2/3}
space, which also puts a lower bound on schemes storing five elements. In this
work, we have improved the lower bound to m^{3/4}. We also present a scheme for
the same that takes O(m^{5/6}) space. This improves upon the
O(m^{18/19})-scheme due to Garg [Ph.D. Thesis] and the O(m^{10/11})-scheme due
to Baig et al. [WALCOM 2019]. |
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DOI: | 10.48550/arxiv.1910.03651 |