On the continuous Zauner conjecture

Abstract

In a recent paper by S. Pandey, V. Paulsen, J. Prakash, and M. Rahaman, the authors studied the entanglement breaking quantum channels t:Cd× d Cd × d for t ∈ [-1d2-1, 1d+1] defined by t(X) = tX+ (1-t)Tr(X) 1dI. They proved that Zauner's conjecture is equivalent to the statement that entanglement breaking rank of 1d+1 is d2. The authors made the extended conjecture that ebr(t)=d2 for every t ∈ [0, 1d+1] and proved it in dimensions 2 and 3. In this paper we prove that for any t ∈ [-1d2-1, 1d+1] \0\ the equality ebr(t)=d2 is equivalent to the existence of a pair of informationally complete unit norm tight frames \|xi\i=1d2, \|yi\i=1d2 in Cd which are mutually unbiased in a certain sense. That is, for any i≠ j it holds that | xi|yj|2 = 1-td and | xi|yi|2 = t(d2-1)+1d (also it follows that | xi|xj yi|yj|=|t|). Though, our numerical searches for solutions were not successful in dimensions 4 and 5 for values of t other than 0 or 1d+1.

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