Authors: Radmanović, Miloš
Stanković, Radomir 
Affiliations: Mathematical Institute of the Serbian Academy of Sciences and Arts 
Title: Construction of multiple-valued bent functions using subsets of coefficients in GF and RMF domains
Journal: IEICE Transactions on Information and Systems
Volume: E104D
Issue: 8
First page: 1103
Last page: 1110
Issue Date: 2021
Rank: ~M23
ISSN: 1745-1361
DOI: 10.1587/transinf.2020LOP0009
Abstract: 
Multiple-valued bent functions are functions with highest nonlinearity which makes them interesting for multiple-valued cryptography. Since the general structure of bent functions is still unknown, methods for construction of bent functions are often based on some deterministic criteria. For practical applications, it is often necessary to be able to construct a bent function that does not belong to any specific class of functions. Thus, the criteria for constructions are combined with exhaustive search over all possible functions which can be very CPU time consuming. A solution is to restrict the search space by some conditions that should be satisfied by the produced bent functions. In this paper, we proposed the construction method based on spectral subsets of multiple-valued bent functions satisfying certain appropriately formulated restrictions in Galois field (GF) and Reed-Muller-Fourier (RMF) domains. Experimental results show that the proposed method efficiently constructs ternary and quaternary bent functions by using these restrictions.
Keywords: Bent functions | Construction | Cryptography | Galois field and Reed-Muller-Fourier domain | Multiple-valued functions
Publisher: Institute of Electronics Information Communication Engineers
Project: Development of new information and communication technologies, based on advanced mathematical methods, with applications in medicine, telecommunications, power systems, protection of national heritage and education 

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