Constructions of mutually unbiased entangled bases

Abstract

We construct two mutually unbiased bases by maximally entangled states (MUMEBs) in C2 C3. This is the first example of MUMEBs in Cd Cd' when d d', namely d' is not divisible by d. We show that they cannot be extended to four MUBs in C6. We propose a recursive construction of mutually unbiased bases formed by special entangled states with a fixed Schmidt number k (MUSEBks). It shows that \t1,t2\ MUSEBk1k2s in Cpd Cqd' can be constructed from t1 MUSEBk1s in Cd Cd' and t2 MUSEBk2s in Cp Cq for any d,d',p,q. Further, we show that three MUMEBs exist in Cd Cd' for any d,d' with d d', and two MUMEBs exist in Cd Cd' for infinitely many d,d' with d d'.