Tuesday,
July 23, 1:45 4:15 PM |
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Room
A (34-301): Quantum Information Theory and Coding |
Paper
# |
M.
Sohma and O. Hirota
Channel Capacity and Reliability Function for Quantum
Channels" |
TU-A1 |
K.
Tanaka and M. Osaki
Accessible Information of 3 Symmetric States in 3-Dimensional
Complex Hilbert Space" |
TU-A2 |
P.
Stelmachovic, M. Ziman, V. Buzek, M. Hillery, V. Scarani, and
N. Gisin
Physics of Open Systems from the Point of Information
Theory |
TU-A3 |
C.
King and M. B. Ruskai
The Holevo Capacity for Qubit Channels |
TU-A4 |
G.
K. Brennen, D. D. Song, and C. J. Williams
Quantum Bus Channels and Efficient Non-Local Operations |
TU-A5 |
A.
N. Soklakov and R. Schack
Optical Information |
TU-A6 |
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Room
B (34-302): Spin-Based Quantum Computation I |
Paper
# |
L.
K. Thomsen, H. M. Wiseman, and S. Mancini
Spin Squeezing via Continuous QND Feedback |
TU-B1 |
E.
Pazy, E. Biolatti, T. Calarco, L. D'Amico, P. Zanardi, F. Rossi,
and P. Zoller
Paving the Road for an All-Optical Spin-Based Quantum
Computer |
TU-B2 |
A.
S. Verhulst, J. P. Strahan, and Y. Yamamoto
Optical Pumping of 28Si and 29Si for State Initialization
of an All-Optical Silicon Quantum Computer |
TU-B3 |
C.
Ramanathan, H.-J. Cho, P. Cappellaro, G. S. Boutis and D. G.
Cory
Exploring Large Nuclear Spin Systems in the Solid State
Using NMR |
TU-B4 |
M.
Friesen, R. Joynt, and M. A. Eriksson
Digital Qubits |
TU-B5 |
N.
Boulant, T. F. Havel, M. Pravia, and D. G. Cory
Methods for Process Tomography in NMR Quantum Information
Processing |
TU-B6 |
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Room
C (34-303): Quantum Dynamics and Geometry |
Paper
# |
H.-S.
Goan and G. J. Milburn
An Analysis of Reading Out the State of a Charge Qubit |
TU-C1 |
I.
Fuentes-Guridi, A. Carollo, S. Bose, and V. Vedral
Vacuum Induced Spin-1/2 Berry Phase |
TU-C2 |
J.
Gambetta and H. M. Wiseman
Non-Markovian Stochastic Schrödinger Equation
|
TU-C3 |
M.
J. Bremner
Universal Simulation of Hamiltonian Dynamics |
TU-C4 |
J.
Vala and K. B. Whaley
Encoded Universality for Generalized Anisotropic Exchange
Hamiltonians |
TU-C5 |
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|
Room
D (34-401): Entanglement I |
Paper
# |
G.
Auberson, G. Mahoux, S. M. Roy, and V. Singh
Phase Space Bell Inequalities, Four Marginal Theorem and
Quantum Entanglement Measures" |
TU-D1 |
M.
S. Leifer
Optimal Entanglement Generation from Quantum Operations |
TU-D2 |
F.
Morikoshi and M. Koashi
Entanglement Concentration via Deterministic Transformation |
TU-D3 |
T.
J. Osborne and M. A. Nielsen
Extensive Entanglement Measures |
TU-D4 |
P.
Jorrand and M. Mhalla
Characterizing Separable Pure States of Multi-Qubit Systems
|
TU-D5 |
Y.
Omar
Entanglement and Quantum Statistics |
TU-D6 |
T.-C.
Wei, P. M. Goldbart, and P. G. Kwiat
Maximally Entangled Mixed States and Their Dependence
on Measures of Entanglement and Mixedness |
TU-D7 |
M.
F. Sacchi and G. M. D'Ariano
General Scheme for Entanglement Transformations |
TU-D8 |
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Room
D (34-401): Entangled Photons I |
Paper
# |
G.
Di Giuseppe, M. Atatüre, M. Shaw, Y.-T. Liu, A. V. Sergienko,
B. E. A. Saleh, and M. C. Teich
Ultrafast Generation of Two-Photon Entangled States using
Two Nonlinear Crystals |
TU-D9 |
K.
C. Toussaint, Jr., M. T. Corbo, A. F. Abouraddy, A. V. Sergienko,
B. E. A. Saleh, and M. C. Teich
Polarization-Entangled Photon Pairs Obviate Need for Calibration
in Material Characterization |
TU-D10 |
M.
Takeoka and M. Sasaki
Two-Frequency-Mode Entanglement Generation Inside an Optical
Pulse by a Nonlinear Fiber and Spectral Pulse Shaping |
TU-D11 |
A.
Gatti, R. Zambrini, M. San Miguel, and L. A. Lugiato
Macroscopic Polarization Entanglement in Spontaneous Parametric
Downconversion |
TU-D12 |
E.
J. Mason, M. A. Albota, F. König, and F. N. C. Wong
A Frequency-Nondegenerate Entanglement Source using Periodically
Poled Lithium Niobate |
TU-D13 |
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Room
D (34-401): Quantum Measurement |
Paper
# |
K.
L. Pregnell and D. T. Pegg
Selective Measurement of Individual Elements of the Optical
Density Matrix |
TU-D14 |
J.
I. Concha and H. V. Poor
An Optimality Property of the Square-Root Measurement
for Mixed States |
TU-D15 |
W.
J. Munro
High Precision Measurements and their Application to Weak
Force Detection |
TU-D16 |
M.
G. A. Paris
Entanglement as a Tool to Improve Precision of Quantum
Measurements |
TU-D17 |
K.
Hunter, E. Andersson, and S. M. Barnett
Optimal Measurement Strategies for a Mirror Symmetric
Set of Three Qubit States |
TU-D18 |
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Room
D (34-401): Quantum Manipulations with Linear Optics |
Paper
# |
P.
Kok
Making a Single-Photon QND Device with Linear Optics |
TU-D19 |
T.
C. Ralph and A. Lund
Single Rail Quantum Logic in Optics |
TU-D20 |
S.
Iblisdir, N. J. Cerf, J. Fiurasek, and S. Massar
Conditional Generation of Large Photon-Number Path Entanglement
using Linear Optics |
TU-D21 |
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