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 (n, k)=1, and a∈F3n*, the function f(x)=Tr(ax3k+12) is weakly regular bent over F3n, where Tr(·):F3n→F3 is the trace function. This is the well-known Coulter-Matthews bent function. In this paper, we determine the dual function of f(x) completely. As a consequence, we find many classes of ternary bent functions not reported in the literature previously. Such bent functions are not quadratic if k>1, and have ((1+52)w+1-. .(1-52)w+1)/5 or ((1+52)n-w+1-. .(1-52)n-w+1)/5 trace terms, where 0<w<n and wk 1\ (\;n). Among them, five special cases are especially interesting: for the case of k=(n+1)/2, the number of trace terms is ((1+52)n-1-. .(1-52)n-1)/5; for the case of k=n-1, the number of trace terms is ((1+52)n-. .(1-52)n)/5; for the case of k=(n-1)/2, the number of trace terms is ((1+52)n-1-. .(1-52)n-1)/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.