Connecting the UMEB in Cdd with partial Hadamard matrices

Abstract

We study the unextendible maximally entangled bases (UMEB) in Cdd and connect it with the partial Hadamard matrix. Firstly, we show that for a given special UMEB in Cdd, there is a partial Hadamard matrix can not extend to a complete Hadamard matrix in Cd. As a corollary, any (d-1)× d partial Hadamard matrix can extend to a complete Hadamard matrix. Then we obtain that for any d there is an UMEB except d=p\ or\ 2p, where p 3 4 and p is a prime. Finally, we argue that there exist different kinds of constructions of UMEB in Cndnd for any n∈ N and d=3×5 ×7.