Related references
Note: Only part of the references are listed.Are Random Pure States Useful for Quantum Computation?
Michael J. Bremner et al.
PHYSICAL REVIEW LETTERS (2009)
Most Quantum States Are Too Entangled To Be Useful As Computational Resources
D. Gross et al.
PHYSICAL REVIEW LETTERS (2009)
Transitions in the computational power of thermal states for measurement-based quantum computation
Sean D. Barrett et al.
PHYSICAL REVIEW A (2009)
Epsilon-measures of entanglement
Caterina-E Mora et al.
NEW JOURNAL OF PHYSICS (2008)
Phase transition of computational power in the resource states for one-way quantum computation
Daniel E. Browne et al.
NEW JOURNAL OF PHYSICS (2008)
Measurement-based quantum computer in the gapped ground state of a two-body Hamiltonian
Gavin K. Brennen et al.
PHYSICAL REVIEW LETTERS (2008)
Percolation, renormalization, and quantum computing with nondeterministic gates
K. Kieling et al.
PHYSICAL REVIEW LETTERS (2007)
Entanglement and local information access for graph states
Damian Markham et al.
NEW JOURNAL OF PHYSICS (2007)
Fundamentals of universality in one-way quantum computation
M. Van den Nest et al.
NEW JOURNAL OF PHYSICS (2007)
Novel schemes for measurement-based quantum computation
D. Gross et al.
PHYSICAL REVIEW LETTERS (2007)
Classical simulation versus universality in measurement-based quantum computation
M. Van den Nest et al.
PHYSICAL REVIEW A (2007)
Universal resources for measurement-based quantum computation
Maarten Van den Nest et al.
PHYSICAL REVIEW LETTERS (2006)
Simple proof of fault tolerance in the graph-state model
P Aliferis et al.
PHYSICAL REVIEW A (2006)
Distance measures to compare real and ideal quantum processes
A Gilchrist et al.
PHYSICAL REVIEW A (2005)
Fault-tolerant quantum computation with cluster states
MA Nielsen et al.
PHYSICAL REVIEW A (2005)
Quantum computation by measurements
DW Leung
INTERNATIONAL JOURNAL OF QUANTUM INFORMATION (2004)
Adiabatic quantum computation and quantum phase transitions -: art. no. 062302
JI Latorre et al.
PHYSICAL REVIEW A (2004)
Geometric measure of entanglement and applications to bipartite and multipartite quantum states
TC Wei et al.
PHYSICAL REVIEW A (2003)
Measurement-based quantum computation on cluster states
R Raussendorf et al.
PHYSICAL REVIEW A (2003)
Quantum computation by measurement and quantum memory
MA Nielsen
PHYSICS LETTERS A (2003)
Monotones and invariants for multi-particle quantum states
H Barnum et al.
JOURNAL OF PHYSICS A-MATHEMATICAL AND GENERAL (2001)
Schmidt measure as a tool for quantifying multiparticle entanglement
J Eisert et al.
PHYSICAL REVIEW A (2001)
A one-way quantum computer
R Raussendorf et al.
PHYSICAL REVIEW LETTERS (2001)
A quantum adiabatic evolution algorithm applied to random instances of an NP-complete problem
E Farhi et al.
SCIENCE (2001)
Persistent entanglement in arrays of interacting particles
HJ Briegel et al.
PHYSICAL REVIEW LETTERS (2001)
Three qubits can be entangled in two inequivalent ways -: art. no. 062314
W Dür et al.
PHYSICAL REVIEW A (2000)
Share Paper
