superconductivity
DESCRIPTION
Superconductivity. Superconductivity. The phonon -mediated attractive electron-electron interaction leads to the formation of Cooper-pairs which undergo a k -space condensation. This condensate is a charged quantum liquid described by a macroscopic wave function. - PowerPoint PPT PresentationTRANSCRIPT
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Superconductivity
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The phonon-mediated attractive electron-electroninteraction leads to the formation of Cooper-pairs
which undergo a k-space condensation
Superconductivity
kF k
F
k
k
Metal
F
Vk ' k
h
D
V
H
kc
k† c
kk , V
k ' kc
k '† c k '
† ck c
k k
n
1 3 =
The superconducting transition at
produces a gap
in the electronic excitation spectrum, thus removing all low energy excitations.
Tc1.13 h
De 1 N0V
1.764 Tc
This condensate is a charged quantum liquid described by a
macroscopic wave function
,, .r tir t e
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Josephson junctions
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Josephson junctions,are weak links connecting two superconducting leads/islands. They appear in various forms, e.g., as
tunnel junctions
lr
constrictions
l rg
g
VV
l l
r r
l
r
i
i
e
e
( ) 1 cos 1 cos
/ 2
J JE Const E Er l l r r l
d dt eV
energy
dynamic phase
Josephson relations describing the junction energy and the phase evolution
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Two energy scales
phase 0
Q Qcharge
charging (capacitive) energy EC
e2
2C
current (inductive) energy EJ
Ic0
2c
The particle number N = Q/2e and the phase are conjugate variables, i.e., we have a particle phase duality [N,] = i (Anderson)
J CE Eclassical limit
current I
J CE Equantum limit
Fock space
N
N 1
N 2
N 1
N 2
exp i exp i
fixed phase fixed charge Q=2eN
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Classical & quantum limits
phase 0
Q Qcharge
charging (capacitive) energy EC
e2
2C
current (inductive) energy EJ
Ic0
2c
[N,] = i
current I
2 22 24 1 cosJ
CeL E
2
2 1 cosC Jd
dH E E ~ E
J
2
2
N i d
d
action
Hamiltonian
2capacitive
222
2
24
C
Ce
E V
Einductive EJ 1 cos
Einductive : Ic sin
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Classical limit: gauge invariance and fluxoid quantization in a loop
Free energy of a loop with inductance L:
F E1 1 cos E2 1 cos2 .... 12L ext 1 2 .... 2 .
0
0
2
1 22
0 1 2
2 ...
.....
leads junctions
junctions
A ds ds A ds
n A ds
n
02
gauge invariantphases
02,j A A
0s 2 in the leads,
hence
and
H
ext
self
2
F
0
1 junction: 2 junctions:
kinetic energy of currents ()
In a small inductance loop,
ii
ext
example :
ext 0 2
unique
In a large inductance loop,
n0
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Quantum limit: Coulomb blockade and charge quantization on an island
V
Vn
V2
Visl ViCi
i Ne
Cii
C
C1
C2
Cn
electrostatic energy U 1
2 Cii
Visl Vi 2
U 12C
Cij i C j Vi Vj 2
(Ne)2
2C
Visl
U 0 & add N electrons
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Quantum limit: Coulomb blockade and charge quantization on an island
= 0
Vg
V2 = 0
Visl ViCi
i Ne
Cii
C
C1
C2
Cg
electrostatic energy U 1
2 Cii
Visl Vi 2
U 12C
Cij i C j Vi Vj 2
(Ne)2
2C
Visl
U 0 & add N electrons
Account for the work done by the batterieswhen changing the island charge N
E 12C
CgVg Ne 2 const.
Vg
N N 1
E
EC e2
2C
0Vg
N
0
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… in general
Vg
N N 1
E
EC
0
Vg
E
EC
chargemixing by EJ
0
0J CE E 0 J CE E
F
0
N N 1
F
0
fluxmixing by EC
ext 0 2
Qext 2e 2
H E
Cd2
d2 EJ
1 cos H EC Next Q 2e 2 EJ2 Q Q .
1 4
8
J C
J C
E Ep J C
E E
E E e
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RCSJ model, adding dissipation
2
2 2sin ,
4.
Q
Q
cQ e e
R IR
Re
IRC
with the quantum resistance
I
R
C
Icadditional shunt resistor, e.g., accountingfor quasi-particle tunneling.
Effective action describing the Resistively and Capacitively Shunted Josephson junction:
2
22
2 '
4 '1 cos '16 C
JQR
REd E dS
ohmic dissipation (Caldeira-Leggett)
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Schmid transition: T=0 quantum phase transition, driven by the environment
H
0 2 2
small inductance loop: two well potential
large inductance loop:particle in periodic potential
0
F
F
0
F
0 0
F
2 RQ R = 1, weak dissipation limit with delocalized phase
2 RQ R 1, strong dissipation limit with localized phase -- superconducting junction
(Leggett-Chakravarti)
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classical computing
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Charles Babbage1791-1871
Ada Byron, Lady Lovelace
1815-1852
First `Programmer’ and
Enigma,cracked by
Alan Turing with help of COLOSSUS
Inventor of theDifference Engine
1834
Mechanics
The `full’ version of this machine
was built in1991 by the Science
Museum,London
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Electronics
Built at University of Pennsylvania,it included 18’000 tubes, weighed 30 tons, required 6 operators,and 160 m2 of space.
The ENIAC (Electronic Numerical
Integrator and Computer) computer
was built in 1946
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HardwareClassical computer
Si-wafer
Capacitors:
Transistors:
Bits
Gates
1-bit gate: NOT
2-bit gate: AND
Rinput
Vg
output
Vsd
0 : V 0,
1 : V 0.
Vg
0, closed,
Vg
0, open.
R
Vg1
input
Vg2 output
Vsd
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Transistors
Packed DeviceFirst Integrated Circuit, 1958 Jack Kilby, Texas Instruments
First Transistor, 1947Bell Laboratories
Bardeen, Brattain, & Shockley
Pentium Processor, 1997, Intel
in 50 Years
from 1 to 107
transistors
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Nanoscale Technology
Ultra-short channel Si-MOSFET, IBM
0.5 m wide, 0.1 m channel
source
drain
gate insulator
Si-wafer
V
channel
Switch a MOSFET with 1000 electrons, while a SET requires only one!
2 m
Single Electron Transistor (SET), AlTechnology
PTB gate
source drain
box
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Applications
Classical computers solve any computational task …..
Your washing machine
Your agenda
…. but some are really hard !
Your science
Your bank account
Your track controlin the car
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Computational Complexity An input x is quantified via its information content L = log2 x.
A calculation is characterized by the number s of steps (logical gates) involved.
A problem is class P (efficiently solvable) if s is polynomial in L,
A `classic’ hard problem is that of prime factorization: given a non-prime number N, find its factors;
the best known algorithm scales as s ~ exp (2 L1/3 (lnL)2/3).
~s L
~ exps LA problem is deemed `hard’ (not in P) if s scales exponentially in L,
A modern computer can factor a 130-decimal-digits number (L = 300) in a few weeks days;
1827365426354265930284950398726453672819048374987653426354857645283905612849667483920396069782635471628694637109586756325221365901
doubling L would take millions of years to carry out this calculation.
A quantum computer would do the job within minutes
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Public Key Encryption
,,
, ,
mod
mod
( 1) 1o )1 m d (
pt s q
s
M
E M
M E
p q
p qt
s N
s
N
N
message
( public keyno )n-Encoding
Decoding
A quantum computer would crack this encryption scheme
(Rivest, Shamir & Adleman, 1978)
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Quantum computing
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``…nature isn’t classical, dammit, and if you want to make asimulation of nature, you’d better make it quantum mechanical…”
R. Feynman
2LIf one has N quantum two level systems (e.g. L spins) they can have differentstates. To describe such a system in classical computer one needs to have complex numbers, that requires exponentially large computational resources. Thus modeling even small quantum system on a classical computer is practically impossibletask. But since Nature does it very efficiently one can try to use its ability to deal withquantum systems and to apply it also for computational problem.
2L
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Bits and Qubits
A quantum bit (qubit) is the quantum mechanical generalization of a classical bit, a two-level system such as a spin, thepolarization of a photon, or ring currents in a superconductor.
0, 1
Classical bit
Physical realization via a charged/uncharged capacitor
0 V
1 V
Q Q
Quantum bit
Physical realization via a quantum two-level system
spins ring-currentspolarizations
21, 0 1ia aea
spin language
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Classical & quantum gates IThe possibilities to manipulate a classical bit are quite
limited: The NOT-gate simply interchanges the two values 0 and 1 of the classical bit.
i f
0
01
1
On the other hand, manipulation of a quantum bit is much richer! For a spin / two-level system we can perform rotations around the x -, y -, and z - axis; placing the `spin’ S (with magnetic moment ) into a magnetic field H, the Hamiltonian
produces the desired rotation. …. S H
phaseshifter
/ 2
/ 2
0,
0
z
z
i H t
i H t
eU
e
/ 2 / 2 20 1 1 .z zi H t i H te ea at
H = Hz we obtain the time evolution
E.g., with
H = Hx we obtain the time evolution
cos sin
sin cos,x x
x x
H t i H t
i H t H tU
0 1tancos .xxH t i H tt
amplitudeshifter (a = 0)
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Classical & quantum gates II
NOT AND OR The combination of the classicalgates allows us to construct all manipulations on classical bits.
i f0
011
i f00
i0 0
010011
1
1
i f00
i0 0
011111
1
1Is there a set of universal quantum gates ?How does such a set look like ?
irreversible
phaseshifter
cos 2 sin 2,
sin 2 cos 2
i
i
ieU
ie
0 a ei 1 1 a2 .
Singlequbit gates:Rotations
amplitudeshifter
Hadamard (basis change):
H 1
2
1 1
1 1
:
0
1
0 1 2,
0 1 2.
H
U
1 0 0 0
0 1 0 0
0 0 0 1
0 0 1 0
Twoqubit gate:XOR (CNOT)
i f00
i0 0
011101
1
1
control
target
The target flips if the control is on 1
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Entangling two qubits
H
0 0 00 11 2 HXOR
H 0 0 1 2
put control qubit C into superposition state, then future gates act on two states
simultaneously
i.e., target qubit T gets flipped AND non-flipped
maximally entangledBell state
C
T
And subsequently: flipping a qubit in an entangled state modifies all its components
0
0
00 11
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Quantum Algorithms
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Quantum algorithms
Shor’s Factorization algorithm (1994)
finds prime factors in polynomial, rather than exponential time.
N
Grover’s Search algorithm (1997)
searches unstructured database (e.g. telephone book) of N entries by steps.
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Although Grover’s algorithm doesn’t change complexity class it is not less fundamental, than Shor’s algorithm.
It is not hard to prove, that classical algorithms can do no better, than just straight search through the list, requiring on average N/2 steps
(i)
NThe `quantum speed-up’ ~ is greater than that achieved by Shor’s factorization algorithm
(ii) 1/3~ exp 2(ln )( )N
One can show, that no quantum algorithm can do better, than , thus it is optimal!
(iii) O N
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0xAssume that the database contains N elements, N is some power of 2. Let there be only one solution, that we are looking for .
We start with a homogeneous superposition of all basis states
Given an unstructured set of elements, find the one, that corresponds to the answer of some question.
Task:
Grover’s Search algorithm
1
0
1 N
xNs x
1
20 0 0 1
n
nn s sH H H
H 1
2
1 1
1 1
:
0
The Algorithm
This can be achieved, e.g., by starting with n qubits in the state and applying the Hadamard transform
The goal is to to increase the amplitude of the component 0x
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s
The oracle call is just quantum implementation of searching. There must exist unitary operator
s
The algorithm will iterate the Grover rotation G a certain number of times to obtain state very close to . The Grover rotation consists of two parts: an oracle call and a reflection about .
0x
0x
0 0 0, for O x x O x x x x
O s
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We want
s
O s
2
G s
0x
0xEach Grover rotation rotates our state by an angle towards . 2
0 , sin( 2 ) 1tG s x t
Thus we should stop and measure after steps 1 1
( )4 2
Nt
N
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Quantum Hardware
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Physical implementation
All hardware implementations of quantum computers have to deal with the
conflicting requirements of
controllability
while minimizing the coupling to the environment in order to
avoid decoherence.
Solid state implementations
enjoy good scalability & variability
but require careful designs in order to avoid decoherencewhen trying to build Schrödinger cats
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Network model of quantum computing
(David Deutsch, 1985)
00000K 0000 .
initial state
final state
Perturbations from the environment
destroy the parallel evolution of the computation
i
f
Parallel evolutionproviding the
quantum speedup.
01100K 1010 .
• each qubit can be prepared in some known state,
• each qubit can be measured in a basis,
• the qubits can be manipulated through quantum gates
• the qubits are protected from decoherence
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Physical implementations
• trapped atoms (Cirac & Zoller)• photons in QED cavities (Monroe ea, Turchette ea)• molecular NMR (Gershenfeld & Chuang)• 31P in silicon (Kane)
• spins on quantum dots (Loss & DiVincenzo)• 31P in silicon (Kane)• Josephson junctions, charge (Schön ea, Averin) phase (Bocko ea, Mooij ea)
All hardware implementations of quantum computers have to deal with the conflicting requirements of controllability
while minimizing the coupling to the environment in order
to avoid decoherence.
Quantum optics, NMR-schemes Good decoupling & precision:
Solid state implementations Good scalability & variability:
Have to deal with individualatoms, photons, spins,……Problems with control, interconnections,measurements.
Have to deal with many degrees of freedom.Problems with decoherence.
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The rules of the game achievements
Find a system which emulates a spin / quantum two-level system and
• which remains coherent
• which can be manipulated (rotations)
• which can be interconnected and entangled with other qubits
• which can be projected (measured)
• which carries out an algorithm (e.g., Shor’s prime factorization)
Condensed Matter2 charge qubits, interacting
Quantum optics4 9Be ions, deterministic
NMR15 = 3 * 5
Quantum opticsnot a problem
Condensed Matterup to Q ~ 104
Quantum opticsBell inequailty checks
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Superconducting quantum bits
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Superconducting qubits
Currents in a superconducting ring
VCharges on a superconducting island
Josephson junctions
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Superconducting quantum bits
Loop vs Island In a superconducting ring,
the wave function
satisfies periodic boundary conditions. 0
Re
Im
zero flux state
flux one state
The macroscopic wave function winds oncearound the ring; the ring
carries a current
x x exp i x
j x ~ h
2mi * x cc
These two states are degenerate
at half-flux frustration
A finite bias draws a Cooper-pair
onto the island
CP
These two states are degenerate
at half-Cooper-pair frustration
V
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superconductorsuperconductor
phase 0 E
e
CC 2
2 EI
cJc0
2
C JE EJ CE E
Produce a weak spot toflip between flux states:
Josephson junction.
221 cos16 J
CL EE 2
2 1 cosC Jd
dH E E
Frustrate a ring withhalf-flux and obtain
two degenerate flux states
Frustrate an island withhalf-Cooper pair and obtain two degenerate
charge statesOR
CP/2
Connect the box to allow charge hopping:Josephson junction.
Superconducting quantum bits
The Josephson junctions are key ingredients in any superconducting qubit design. Or, in other words,
the Josephson junctions introduce the quantum dynamics into the superconducting structure.
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Three typesCharge
Schön et al.Averin 1997
Vgn
EC
C
C
EJ
n
Flux/Phase
Ig
EJEC
Bocko et al. 1997
Josephson
Ioffe et al.Orlando et al. 1999
Vg
n n 1
EJ
EC
chargemixing by EJ
0
2EJ
2
20
02
1/ 4~ exp
C Jp J CE E E E
Vphase states
CE
superconductor
phase 0
8p J CE E
h
p
EJ
EJ
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Manipulation
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Manipulation
V 0
V Vg
Vg
N N
I CJ J,
Charge Phase
EC
Ig
nEJEC
Vg
N N 1
EJ
E
EC
chargemixing by EJ
C
C
EJ
2EJ
E
2
20
Ig
flux mixing by EC
tunneling gap
1/ 48
~ C
J
JCE
p E
EEe
+ ac-microwave voltage / current
induces transitionsacross the gap
OR+ fast (non-adiabatic)
switching induces(incomplete)
Zener tunneling.0
phase shifter
amplitude shifter
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Manipulation (general)
q
E
one-parameter (q)qubit
two-parameter (q,Q)qubit
phase shift
fast non-adiabaticswitching, amplitude shift
ac-microwaveinduced
transitions(NMR scheme)
q
E
q
trivialidle state
decoupledstates
coupledstatesQ
Q
mixing
phase shift
potential or dynamical
About the NMR scheme:With Nqu qubits the distance between resonances
is ~ / Nqu. The transition time of the k-th qubit
is related to the ac-signal V via
t Vkop ~ .
Other qubits nearby are excited withprobability
and a precise addressing requireslong times
V Vk k
2 2 2
t Nop qu .
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Coherent devices
fast gate voltage pulse
0
2 time
Q
Q
Charge (Nakamura et al., 1999)
1mpulse gate
box
detector
SQUID-loop
detector
tt
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Coherent devices
fast gate voltage pulse
0
2 time
Q
Q
Charge (Nakamura et al., 1999)
1mpulse gate
box
detector
SQUID-loop
detector
t
This time domain experiment shows coherent charge oscillations of 50 100 ps duration during a totalcoherence time of 2 ns.
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Second generation
~100 coherent oscillations observed via Ramsey
interference Chiorescu et al., 2003
PhaseCharge
104 coherent charge oscillations
observed via
Ramsey fringes, Vion et al.,2002
Balanced energy scalesEJ ~ EC
mI
V
Box
2 pulse
2 pulse
free evolution
Ramseyinterference
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Qubit duet, entanglement
Spectral analysis of interacting
J-qubitsBerkley et al., 2003
Spectral analysis ofinteracting q-qubitsPashkin et al., 2003
Josephson-qubitsCharge-qubits
q0q 1q
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Two-qubit
gate
CNOT (XOR)Device
Puls sequence
1 0 0 0
0 1 0 0
0 0 0 1
0 0 1 0
U
Result
Yamamoto et al., 2003
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The End