6533b7d7fe1ef96bd126904d
RESEARCH PRODUCT
Proving The Power Of Postselection
A. C. Cem SayAbuzer Yakaryilmazsubject
FOS: Computer and information sciencesTheoretical computer scienceComputer scienceComputationFOS: Physical sciencesContext (language use)0102 computer and information sciencesComputational Complexity (cs.CC)Computer Science::Computational Complexity01 natural sciencesTheoretical Computer Science0101 mathematicsQuantumQuantum computerQuantum PhysicsAlgebra and Number TheorySpacetime010102 general mathematicsProbabilistic logicQuantum PhysicsRange (mathematics)Computer Science - Computational ComplexityComputational Theory and Mathematics010201 computation theory & mathematicsPostselectionQuantum Physics (quant-ph)Information Systemsdescription
It is a widely believed, though unproven, conjecture that the capability of postselection increases the language recognition power of both probabilistic and quantum polynomial-time computers. It is also unknown whether polynomial-time quantum machines with postselection are more powerful than their probabilistic counterparts with the same resource restrictions. We approach these problems by imposing additional constraints on the resources to be used by the computer, and are able to prove for the first time that postselection does augment the computational power of both classical and quantum computers, and that quantum does outperform probabilistic in this context, under simultaneous time and space bounds in a certain range. We also look at postselected versions of space-bounded classes, as well as those corresponding to error-free and one-sided error recognition, and provide classical characterizations. It is shown that $\mathsf{NL}$ would equal $\mathsf{RL}$ if the randomized machines had the postselection capability.
| year | journal | country | edition | language |
|---|---|---|---|---|
| 2011-11-14 |