Bent Partitions, Vectorial Dual-Bent Functions and Partial Difference Sets
Abstract
It is known that partial spreads is a class of bent partitions. In \cite{AM2022Be,MP2021Be}, two classes of bent partitions whose forms are similar to partial spreads were presented. In \cite{AKM2022Ge}, more bent partitions were presented from (pre)semifields, including the bent partitions given in \cite{AM2022Be,MP2021Be}. In this paper, we investigate the relations between bent partitions and vectorial dual-bent functions. For any prime , we show that one can generate certain bent partitions (called bent partitions satisfying Condition ) from certain vectorial dual-bent functions (called vectorial dual-bent functions satisfying Condition A). In particular, when is an odd prime, we show that bent partitions satisfying Condition one-to-one correspond to vectorial dual-bent functions satisfying Condition A. We give an alternative proof that are bent partitions. We present a secondary construction of vectorial dual-bent functions, which can be used to generate more bent partitions. We show that any ternary weakly regular bent function ( even) of -form can generate a bent partition. When such is weakly regular but not regular, the generated bent partition by is not coming from a normal bent partition, which answers an open problem proposed in \cite{AM2022Be}. We give a sufficient condition on constructing partial difference sets from bent partitions, and when is an odd prime, we provide a characterization of bent partitions satisfying Condition in terms of partial difference sets.
Cite
@article{arxiv.2301.00581,
title = {Bent Partitions, Vectorial Dual-Bent Functions and Partial Difference Sets},
author = {Jiaxin Wang and Fang-Wei Fu and Yadi Wei},
journal= {arXiv preprint arXiv:2301.00581},
year = {2023}
}