Mutually unbiased maximally entangled bases from difference matrices

Abstract

Based on maximally entangled states, we explore the constructions of mutually unbiased bases in bipartite quantum systems. We present a new way to construct mutually unbiased bases by difference matrices in the theory of combinatorial designs. In particular, we establish q mutually unbiased bases with q-1 maximally entangled bases and one product basis in Cq Cq for arbitrary prime power q. In addition, we construct maximally entangled bases for dimension of composite numbers of non-prime power, such as five maximally entangled bases in C12 C12 and C2121, which improve the known lower bounds for d=3m, with (3,m)=1 in Cd Cd. Furthermore, we construct p+1 mutually unbiased bases with p maximally entangled bases and one product basis in Cp Cp2 for arbitrary prime number p.