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Quantum and classical computing

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Title: Quantum and classical computing

1
Quantum and classical computing
THEORETICAL COMPUTER SCIENCE
FER 16.9.2003.
Dalibor HRG
2
How to think?
3
Review / Classical computing

Classical computing
Turing machine (A.Turing,1937.), computability
(functions and predicates), Computational
Complexity theory of classical computation.
Bools algebra and circuits, today computers,
(logic).
Algorithms and complexity classes (P, P/poly,
PSPACE, NP, NP-complete, BPP,) measuring how
efficient is algorithm, can it be useful?

4
Review / Classical computing

Famous mathematical questions today
P predicates which are decidable in polynomial
time (head moves of Turing machine)
PSPACE predicates decidable in polynomial space
(cells on Turing machines track)

5
Review / Classical computing

NP we can check some solution in polynomial
time, but finding it, is a difficult problem.
Predicate
SAT , HC (hamiltonian cycle),TSP (travelling
salesman problem), 3-SAT,
Karps reducebility
NP complete each predicate from NP is
reducible to 3 SAT predicate.

6
Review / Classical computing
7
Review / Classical computing
NANOTECHNOLOGY
8
Review / Quantum computing

(R. Feynman,Caltech,1982.) impossibility to
simulate quantum system!
(D. Deutsch, Oxford, CQC, 1985.) definition of
Quantum Turing machine, quantum class (BQP) and
first quantum algorithm (Deutsch-Jozsa).
Postulates of quantum mechanics, superposition of
states, interference, unitary operators on
Hilbert space, tensorial calculation,

9
Quantum mechanics

Fundamentals dual picture of wave and particle.
Electron wave or particle?

10
Quantum mechanics
11
Waves!
12
Secret of the electron
Does electron interfere with itself?
13
Quantum mechanics

Discrete values of energy and momentum.
State represent object (electrons spin, fotons
polarization, electrons path,) and its square
amplitude is probability for outcome when
measured.
Superposition of states, nothing similar in our
life.
Interference of states.

14
Qubit and classical bit

Bit in a discrete moment is either 0 (0V) or
1 (5V).
Qubit vector in two dimensional complex space,
infinite possibilities and values.
Physically, what is the qubit?

15
Qubit
16
System of N qubits

Unitary operators legal operations on qubit.
Unitary operators holding the lengths of the
states. Important!!

17
Tensors

For representing the state in a quantum register.
Example, system with two qubits
State in this systems is

18
Quantum gates

Quantum circuits (one qubit) Pauli-X (UNOT),
Hadamard (USRN).
(two qubits) CNOT (UCN).

19
Quantum parallelism

All possible values of the n bits argument is
encoded in the same time in the n qubits! This is
a reason why the quantum algorithms have
efficiency!

20
Quantum algorithms (1)
Initial state
Quantum operators
Measurement
Time
21
Quantum algorithms (2)

Idea
1. Make superposition of initial state, all
values of argument are in n qubits.
2. Calculate the function in these arguments so
we have all results in n qubits.
3. Interference ( Walsh-Hadamard operator on the
state of n qubits or register) of all values in
the register. We obtain a result.

22
(No-cloning theorem) Wooters Zurek 1982

Unknown quantum state can not be cloned.
Basis for quantum cryptology (or quantum key
distribution).

23
Quantum cryptology (1)
Alice
Bob
Quantum bits
Eve
24
Quantum cryptology (2)
Public channel for authentication
25
Quantum teleportation Bennett 1982