Quantum interactive proofs with short messages

Author(s)

Beigi, Salman; Shor, Peter W.; Watrous, John

Abstract

This paper considers three variants of quantum interactive proof systems in which short (meaning logarithmic-length) messages are exchanged between the prover and verifier. The first variant is one in which the verifier sends a short message to the prover, and the prover responds with an ordinary, or polynomial-length, message; the second variant is one in which any number of messages can be exchanged, but where the combined length of all the messages is logarithmic; and the third variant is one in which the verifier sends polynomially many random bits to the prover, who responds with a short quantum message. We prove that in all of these cases the short messages can be eliminated without changing the power of the model, so the first variant has the expressive power of QMA and the second and third variants have the expressive power of BQP. These facts are proved through the use of quantum state tomography, along with the finite quantum de Finetti theorem for the first variant. ©2011

Date issued

2011

URI

https://hdl.handle.net/1721.1/124789

Department

Massachusetts Institute of Technology. Department of Mathematics

Journal

Theory of computing

Publisher

Theory of Computing

Citation

Beigi, Salman, Peter Shor, and John Watrous, "Quantum interactive proofs with short messages." Theory of computing 7 (2011): no. 7 url http://www.theoryofcomputing.org/articles/v007a007/ ©2011 Author(s)

Version: Final published version

ISSN

1557-2862