New Classes of Ternary Bent Functions From the Coulter-Matthews Bent Functions

Abstract: It has been an active research issue for many years to construct new bent functions. For k odd with gcd(n, k) = 1, and a ∈ F * 3 n , the function f (x) = T r(ax 3 k +1 2 √ 5; for the case of (n, k) = (5t + 4, 4t + 3) or (5t + 1, 4t + 1) with t ≥ 1, the number of trace terms is 8; and for the case of (n, k) = (7t + 6, 6t + 5) or (7t + 1, 6t + 1) with t ≥ 1, the number of trace terms is 21. As a byproduct, we find new classes of ternary bent functions with only 8 or 21 trace terms.

“…For more history on bent functions, the reader is referred to [27]. There are also some works about generalized bent functions over finite fields [12,13,14,18,19].…”

Two Problems about Monomial Bent Functions

“…For more history on bent functions, the reader is referred to [27]. There are also some works about generalized bent functions over finite fields [12,13,14,18,19].…”

Two Problems about Monomial Bent Functions

A family of optimal ternary cyclic codes with minimum distance five and their duals

A survey on p-ary and generalized bent functions