All Languages in NP Have Very Short Quantum Proofs

Author

Blier, Hugue ; Tapp, Alain

Author_Institution

Lab. d´´Inf. Theor. et Quantique, Univ. de Montreal, Montreal, QC, Canada

fYear

2009

fDate

1-7 Feb. 2009

Firstpage

Lastpage

Abstract

In this paper, we show that all languages in NP have logarithmic-size quantum proofs which can be verified provided that two unentangled copies are given. More formally, we introduce the complexity class QMA_log(2) and show that 3COL isin QMA_log(2). To obtain this strong and surprising result we have to relax the usual requirements: the completeness is one but the soundness is 1-1/poly. Since the natural classical equivalent of QMA_log(2) is uninteresting (it would be equal to P), this result, like many others, stresses the fact that quantum information is fundamentally different from classical information. It also contributes to our understanding of entanglement since QMA_log = BQP.

Keywords

computational complexity; theorem proving; logarithmic-size quantum proofs; short quantum proofs; unentangled copies; Costs; Polynomials; Quantum computing; Quantum entanglement; Stress;

fLanguage

English

Publisher

ieee

Conference_Titel

Quantum, Nano and Micro Technologies, 2009. ICQNM '09. Third International Conference on

Conference_Location

Cancun

Print_ISBN

978-1-4244-3349-0

Electronic_ISBN

978-0-7695-3524-1

Type

conf

DOI

10.1109/ICQNM.2009.21

Filename

4782918

Link To Document

https://search.isc.ac/dl/search/defaultta.aspx?DTC=49&DC=2729050