Apr 10, 2006 · (4,1)-Quantum Random Access Coding Does Not Exist. Authors:Masahito Hayashi, Kazuo Iwama, Harumichi Nishimura, Rudy Raymond, Shigeru Yamashita.

Aug 4, 2006 · (4,1)-Quantum random access coding does not exist—one qubit is not enough to recover one of four bits, M Hayashi, K Iwama, H Nishimura, ...

(4,1)-Quantum random access coding does not exist—one qubit is not enough to recover one of four bits · Masahito Hayashi, K. Iwama, +2 authors. S. Yamashita ...

Our proof idea is to use the well-known geometric fact that a three- dimensional ball cannot be divided into 16 nonempty regions by four planes. (Interestingly, ...

(4,1)-Quantum random access coding does not exist—one qubit is not enough to recover one of four bits ... coding such that p > 1/2 exists has been open since then ...

A random access code (RAC) is a strategy to encode a message into a shorter one in a way that any bit of the original can still be recovered with non-trivial ...

In addition to the Pauli operations, it uses an approximation of the universal NOT gate [10,13], which maps a point within the Bloch sphere into its antipodes.

Jul 19, 2023 · (4,1)-quantum random access coding does not exist—One qubit is not enough to recover one of four bits. M. Hayashi. ,. K. Iwama. ,. H.

(4,1)-Quantum Random Access Coding Does Not Exist. By: Raymond Harry Rudy; MASAMITSU HAYASHI; Masafumi Nishimura. Published in: 2006 IEEE International ...

(4,1)-Quantum Random Access Coding Does Not Exist. by: Masahito Hayashi; Kazuo Iwama; Harumichi Nishimura; Rudy Raymond; Shigeru Yamashita. Publication date ...