|
|
Quantum Optics
and Quantum Information Group |
|
|
Prof.
Salomon Sylvain Mizrahi |
|
|
||||||||
|
|
Full Professor |
|
|
||||||||
|
|
|
|
|||||||||
|
|
Departamento de Física - UFSCar Caixa Postal 676 - CEP: 13565-905 São Carlos / SP - Brazil |
|
|
|
|
||||||
|
|
Phone: +55-16 3351-8226 (Ext.
219) |
|
|
|
|
||||||
|
|
|
|
|
|
|||||||
|
Education |
|
||||||||||
|
Post-Doc - Tel Aviv University -
TAU - Israel (1977) |
|
||||||||||
|
PhD - Physics - Instituto de Física Teórica (IFT) -
Universidade Estadual Paulista (UNESP) - Brazil (1976) |
|
||||||||||
|
MSc - Physics - Instituto de Física - Universidade de São Paulo
(USP) - Brazil (1972) |
|
||||||||||
|
BSc - Physics - Instituto de Física - Universidade de São Paulo (USP) - Brazil (1969) |
|
||||||||||
|
Publications
|
|
||||||||||
 |
|||||||||||
|
|
Nonadiabatic geometric
phase induced by the Stark shift |
|
|||||||||
|
|
Microscopic models of
quantum-jump superoperators |
|
|||||||||
|
|
Quantum
photodetection distributions with 'nonlinear' quantum jump |
|
|||||||||
|
|
Separability dynamics of two-mode Gaussian states in
parametric conversion and amplification |
|
|||||||||
|
|
O(N)
symmetries, sum rules for generalized Hermite polynomials and squeezed states |
|
|||||||||
|
|
Optical bistability in
sideband output modes induced by squeezed vacuum |
|
|||||||||
|
|
The Wigner function
associated with the Rogers-Szego polynomials |
|
|||||||||
|
|
Energy spectrum,
potential and inertia functions of a generalized f-oscillator, |
|
|||||||||
|
|
Dispersive limit of
the dissipative Jaynes-Cummings model with a squeezed reservoir, |
|
|||||||||
|
|
A consistent quantum model for continuous photodetection processes |
|
|||||||||
|
|
Creating quanta with
an "annihilation" operator |
|
|||||||||
|
|
Controlling Quantum entanglement
through photocounts |
|
|||||||||
|
|
Quantum state exchange between
coupled modes |
|
|||||||||
|
|
Covariance entanglement measure
for two-mode continuous variable systems |
|
|||||||||
|
|
Laguerre moments and
generalized functions |
|
|||||||||
|
|
Effect of phase-sensitive
reservoir on the decoherence of pair-cat coherent states |
|
|||||||||
|
|
Effects of random
migration in population dynamics |
|
|||||||||
|
|
The phase state
revisited: the Heisenberg limit in a quantum nondemolition measurement and
the nonclassical depth of the state |
|
|||||||||
|
|
Phase sensitive
pumping and coherence of superposition states |
|
|||||||||
|
|
Production of two-Fock
states superpositions from even circular states and their decoherence |
|
|||||||||
|
|
Quantum to classical
transition from the cosmic background radiation |
|
|||||||||
|
|
Decoherence and
thermalization dynamics of a quantum oscillator |
|
|||||||||
|
|
Non-classical properties
of even circular states |
|
|||||||||
|
|
Generation of circular
states and Fock states in a trapped ion |
|
|||||||||
|
|
Continuous pumping and
control of a mesoscopic superposition state in a lossy QED cavity |
|
|||||||||
|
|
Probing colored noise
from the index of refraction of strongly driven two-level atoms |
|
|||||||||
|
|
Marginal and
correlation distribution functions in the squeezed-states representation |
|
|||||||||
|
|
Information transfer
in the course of a quantum interaction |
|
|||||||||
|
|
Signal-to-noise
ratio of preamplified homodyne detection in quantum tomography |
|
|||||||||
|
|
Non-Lorentzian line
shape of a forced two-level system described by a nonlinear Schrodinger
equation |
|
|||||||||
|
|
Finite-length soliton
solutions of the local homogeneous nonlinear Schrodinger equation |
|
|||||||||
|
|
Nonlocal effects in
the Be-8 breakup |
|
|||||||||
|
|
Conditions for a
solitonic solution of the Doener-Goldin equation of quantum mechanics |
|
|||||||||
|
|
Stationary stated in
saturated two-photon processes and generation of phase-averaged mixtures of
even and odd quantum states |
|
|||||||||
|
|
Nonlinear
Schrodinger-Liouville equation with antihermitian terms |
|
|||||||||
|
|
Operational approach
for reconstruction of quantum distributions in a preamplified homodyne-detection
scheme |
|
|||||||||
|
|
Collisional
semiclassical approximations in phase-space representation |
|
|||||||||
|
|
Exact stationary photon
distributions due to competition between one- and two-photon absorption and
emission |
|
|||||||||
|
|
Photon distribution
drift in multiphoton absorption-emission processes due to one-photon
perturbations |
|
|||||||||
|
|
Susceptibility
of strongly driven two-level atoms: A non-Markovian analysis |
|
|||||||||
|
|
Competition
between one- and two-photon absorption processes |
|
|||||||||
|
|
Dissipative
mass-accreting quantum oscillator |
|
|||||||||
|
|
Quasicausal expansion
of the quantum Liouville propagator |
|
|||||||||
|
|
Decay
times of quantum states in one- and two-photon absorption processes |
|
|||||||||
|
|
Quantum coherence in a
dissipative-driven system and the optical Stern-Gerlach experiment |
|
|||||||||
|
|
A
nonlinear model of the collective spontaneous emission by a spin system S.S.
Mizrahi, V. V. Dodonov, and D. Otero Mod.
Phys. Lett. B 10, 1339 (1996) |
|
|||||||||
|
|
Effects of temperature
on the absorption line-shape function for driven 2-level atoms - a
non-markovian treatment |
|
|||||||||
|
|
General-solutions of
the pseudo-diffusion equation of squeezed states |
|
|||||||||
|
|
Generalized nonlinear
doebner-goldin schrodinger-equation and the relaxation of quantum-systems |
|
|||||||||
|
|
Uniform
nonlinear evolution-equations for pure and mixed quantum states |
|
|||||||||
|
|
Non-markovian analysis
of coherence in a driven 2-level atom |
|
|||||||||
|
|
The quadratic
time-dependent hamiltonian - evolution operator, squeezing regions in
phase-space and trajectories |
|
|||||||||
|
|
Os processos irreversíveis e algumas de suas equações cinéticas |
|
|||||||||
|
|
A new
class of nonlinear generalizations of the schrodinger-equation V. V.
Dodonov and S. S. Mizrahi |
|
|||||||||
|
|
Pseudo-diffusion
equation and information entropy of squeezed-coherent states S. S.
Mizrahi and M. A. Marchiolli Physica A
199, 96 (1993) |
|
|||||||||
|
|
Doebner-Goldin
nonlinear model of quantum-mechanics for a damped oscillator in a
magnetic-field V.
V. Dodonov and S. S. Mizrahi |
|
|||||||||
|
|
Recurrence and
decoherence times of quantum states in a measurement process |
|
|||||||||
|
|
V. V.
Dodonov and S. S. Mizrahi Strict
lower-bound for the spatial spreading of a relativistic particle Phys.
Lett. A 177, 394 (1993) |
|
|||||||||
|
|
Pulsed
superradiant emission from a magnetic dipole system |
|
|||||||||
|
|
Einstein-Podolsky-Rosen-Bohm
correlation for light polarization |
|
|||||||||
|
|
Generation of
squeezing for a charged oscillator and for a charged-particle in a
time-dependent electromagnetic-field |
|
|||||||||
|
|
Squeezed states, generalized
hermite-polynomials and pseudodiffusion equation |
|
|||||||||
|
|
Quantum brownian
particle and memory effects |
|
|||||||||
|
|
Deviation from the
sech2 superradiant emission law in a 2-level atomic system |
|
|||||||||
|
|
Squeezed states
phase-space representation and semiclassical approximations in many-body
systems |
|
|||||||||
|
|
May the atomic
superradiant emission be described by a single-particle mean-field
hamiltonian |
|
|||||||||
|
|
The geometrical phase: an
approach through the use of invariant |
|
|||||||||
|
|
|
|
|||||||||
|
|
Memory effects in the
2-level atomic model |
|
|||||||||
|
|
On the equivalence between
the wave-packet phase-space representation (WPPSR) and the phase-space
generated by the squeezed states |
|
|||||||||
|
|
Quantum-mechanics in
the gaussian wave-packet phase-space representation .3. from phase-space
probability functions to wave-functions |
|
|||||||||
|
|
Quantum-mechanics in
the gaussian wave-packet phase-space representation .2. dynamics |
|
|||||||||
|
|
Quantum-mechanics in
the gaussian wave-packet phase-space representation |
|
|||||||||
|
|
Parametrization of open
systems with effective quadratic hamiltonians plus stochastic force |
|
|||||||||
|
|
The path integral approach
for the nuclear collective motion |
|
|||||||||
|
|
Collective hamiltonians
in the generator-coordinate method - a numerical procedure |
|
|||||||||
|
|
Quantum friction in
the c-number picture - the damped harmonic-oscillator |
|
|||||||||
|
|
|
||||||||||
|
|
|||||||||||
|
|
Comments and Suggestions |
|
|||||||||
