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DCC
2006
IEEE

A New Characterization of Semi-bent and Bent Functions on Finite Fields*

14 years 11 months ago
A New Characterization of Semi-bent and Bent Functions on Finite Fields*
We present a new characterization of semi-bent and bent quadratic functions on finite fields. First, we determine when a GF(2)-linear combination of Gold functions Tr(x2i +1 ) is semi-bent over GF(2n ), n odd, by a polynomial GCD computation. By analyzing this GCD condition, we provide simpler characterizations of semi-bent functions. For example, we deduce that all linear combinations of Gold functions give rise to semi-bent functions over GF(2p ) when p belongs to a certain class of primes. Second, we generalize our results to fields GF(pn ) where p is an odd prime and n is odd. In that case, we can determine whether a GF(p)-linear combination of Gold functions Tr(xpi +1 ) is (generalized) semi-bent or bent by a polynomial GCD computation. Similar to the binary case, simple characterizations of these p-ary semi-bent and bent functions are provided.
Khoongming Khoo, Guang Gong, Douglas R. Stinson
Added 25 Dec 2009
Updated 25 Dec 2009
Type Conference
Year 2006
Where DCC
Authors Khoongming Khoo, Guang Gong, Douglas R. Stinson
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