AbstractWe present a general criterion for near bent functions to be bent on a hyperplane. Let n=3k±1 be odd and let d=4k−2k+1. We show that the Kasami–Welch function Tr(xd) is a bent function when restricted to the hyperplane of trace 0 elements in F2n
Bent functions over the finite fields of an odd characteristic received a lot of attention of late y...
Bent functions have connections into various areas of mathematics and computer science which makes t...
AbstractA Boolean function with an even number n=2k of variables is called bent if it is maximally n...
AbstractWe present a general criterion for near bent functions to be bent on a hyperplane. Let n=3k±...
AbstractWe give a construction of bent functions in dimension 2m from near-bent functions in dimensi...
In this article a technique for constructing p-ary bent functions from plateaued functions is prese...
We study bent functions which are as different as possible from linear functions. Functions that rem...
AbstractThe question if there exist nonnormal bent functions was an open question for several years....
AbstractBent functions are those Boolean functions whose Hamming distance to the Reed–Muller code of...
AbstractIn this article a technique for constructing p-ary bent functions from near-bent functions i...
AbstractThe question if there exist nonnormal bent functions was an open question for several years....
AbstractIn this paper, we present three results on bent functions: a construction, a restriction, an...
AbstractJet Jqm denote the set of m-tuples over the integers modulo q and set i=−1, w = ei(2πq). As ...
Bent functions are Boolean functions which have maximum possible nonlinearity i.e. maximal distance ...
AbstractIn this paper we use certain results on the divisibility of Gauss sums, mainly Stickelberger...
Bent functions over the finite fields of an odd characteristic received a lot of attention of late y...
Bent functions have connections into various areas of mathematics and computer science which makes t...
AbstractA Boolean function with an even number n=2k of variables is called bent if it is maximally n...
AbstractWe present a general criterion for near bent functions to be bent on a hyperplane. Let n=3k±...
AbstractWe give a construction of bent functions in dimension 2m from near-bent functions in dimensi...
In this article a technique for constructing p-ary bent functions from plateaued functions is prese...
We study bent functions which are as different as possible from linear functions. Functions that rem...
AbstractThe question if there exist nonnormal bent functions was an open question for several years....
AbstractBent functions are those Boolean functions whose Hamming distance to the Reed–Muller code of...
AbstractIn this article a technique for constructing p-ary bent functions from near-bent functions i...
AbstractThe question if there exist nonnormal bent functions was an open question for several years....
AbstractIn this paper, we present three results on bent functions: a construction, a restriction, an...
AbstractJet Jqm denote the set of m-tuples over the integers modulo q and set i=−1, w = ei(2πq). As ...
Bent functions are Boolean functions which have maximum possible nonlinearity i.e. maximal distance ...
AbstractIn this paper we use certain results on the divisibility of Gauss sums, mainly Stickelberger...
Bent functions over the finite fields of an odd characteristic received a lot of attention of late y...
Bent functions have connections into various areas of mathematics and computer science which makes t...
AbstractA Boolean function with an even number n=2k of variables is called bent if it is maximally n...
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