Prof. Masanao
Ozawa
Nagoya University, Nagoya,
Japan
Chubu University, Kasugai,
Japan
Professor
Email:
ozawa@is.nagoya-u.ac.jp
Qualifications
Ph.D., Tokyo Institute of Technology, Japan
M.Sc., Tokyo Institute of Technology, Japan
B.Sc., Tokyo Institute of Technology, Japan
Publications
(Selected)
-
Soundness and
completeness of quantum root-mean-square errors, npj Quantum Information 5: 1
(2019).
-
Measurement theory in
local quantum physics, Journal of Mathematical Physics 57: 015209 (2016) (with K.
Okamura).
-
Experimental
demonstration of a universally valid error-disturbance uncertainty relation in
spin-measurements, Nature Physics 8: 185 (2012) (with J. Erhart, S. Sponar, G.
Sulyok, G. Badurek, Y. Hasegawa).
-
Quantum perfect correlations, Annals of Physics 321: 744 (2006).
-
Uncertainty relations for noise and
disturbance in generalized quantum measurements, Annals of Physics 311: 350 (2004).
-
Universally valid
reformulation of the Heisenberg uncertainty principle on noise and disturbance
in measurement, Physical Review A 67: 042105 (2003).
-
Conservative quantum
computing, Physical Review Letters 89: 057902 (2002).
-
Conservation laws,
uncertainty relations, and quantum limits of measurements, Physical Review
Letters 88: 050402 (2002).
-
Quantum nondemolition
monitoring of universal quantum computers, Physical Review Letters 80: 631
(1998).
-
Canonical approximate
quantum measurements, Journal of Mathematical Physics 34: 5596 (1993).
-
Ultimate information
carrying limit of quantum systems, Physical Review Letters 70: 363 (1993) (with
H. P. Yuen).
-
Does a conservation law limit
position measurements? Physical
Review Letters 67: 1956 (1991).
-
Measurement breaking the
standard quantum limit for free-mass position, Physical Review Letters 60: 385
(1988).
-
On information gain by
quantum measurements of continuous observables, Journal of Mathematical Physics 27: 759 (1986).
-
Concepts of conditional expectations
in quantum theory, Journal of Mathematical
Physics 26: 1948 (1985).
-
Conditional probability
and a posteriori states in quantum mechanics, Publications of the Research
Institute for Mathematical Sciences, Kyoto Univ. 21: 279 (1985).
-
Quantum measuring
processes of continuous observables, Journal of Mathematical Physics 25: 79
(1984).
-
Optimal
measurements for general quantum systems, Reports on Mathematical Physics 18:
11 (1980).