A Further Study of Vectorial Dual-Bent Functions

Abstract

Vectorial dual-bent functions have recently attracted some researchers' interest as they play a significant role in constructing partial difference sets, association schemes, bent partitions and linear codes. In this paper, we further study vectorial dual-bent functions F: Vn(p)→ Vm(p), where 2≤ m ≤ n2, Vn(p) denotes an n-dimensional vector space over the prime field Fp. We give new characterizations of certain vectorial dual-bent functions (called vectorial dual-bent functions with Condition A) in terms of amorphic association schemes, linear codes and generalized Hadamard matrices, respectively. When p=2, we characterize vectorial dual-bent functions with Condition A in terms of bent partitions. Furthermore, we characterize certain bent partitions in terms of amorphic association schemes, linear codes and generalized Hadamard matrices, respectively. For general vectorial dual-bent functions F: Vn(p)→ Vm(p) with F(0)=0, F(x)=F(-x) and 2≤ m ≤ n2, we give a necessary and sufficient condition on constructing association schemes. Based on such a result, more association schemes are constructed from vectorial dual-bent functions.