English

Communication tasks with infinite quantum-classical separation

Quantum Physics 2015-10-05 v4

Abstract

Quantum resources can be more powerful than classical resources - a quantum computer can solve certain problems exponentially faster than a classical computer, and computing a function of two people's inputs can be done with exponentially less communication with quantum messages than with classical ones. Here we consider a task between two players, Alice and Bob where quantum resources are infinitely more powerful than classical ones. Alice is given a string of length n, and Bob's task is to exclude certain combinations of bits that Alice might have. If Alice must send classical messages, then she must reveal nearly n bits of information to Bob, but if she is allowed to send quantum bits, the amount of information she must reveal goes to zero with increasing n. Next, we consider a version of the task where the parties can only send classical messages but may have access to entanglement. When assisted by entanglement, Alice only needs to send a constant number of bits, while without entanglement, the number of bits Alice must send grows linearly with n. The task is related to the PBR theorem which arises in the context of the foundations of quantum theory.

Keywords

Cite

@article{arxiv.1407.8217,
  title  = {Communication tasks with infinite quantum-classical separation},
  author = {Christopher Perry and Rahul Jain and Jonathan Oppenheim},
  journal= {arXiv preprint arXiv:1407.8217},
  year   = {2015}
}

Comments

V4: Added affiliation V3: Slight changes to match journal version. V2: Slight modification in entanglement assisted setting - Alice must now abort rather than Bob. Improved proofs in appendices

R2 v1 2026-06-22T05:17:07.344Z