Microsoft Word – MULT20015 Prac Class 5 2021.docx
MULT20015 Practice Class-5, Ó L. Hollenberg et al 2021 1
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MULT20015 Elements of Quantum Computing
Practice Class 5
Welcome to Practice Class-5 of MULT20015 Elements of Quantum Computing, covering
exercises relevant to the material presented in lectures (9 and 10) in Week 5.
The purpose of this week’s exercises is to:
• understand complexity classes of simple classical algorithms
• simulate and understand Deutsch-Jozsa algorithm by implementing it on QUI
• simulate and understand Simon’s algorithm by implementing it on QUI
The exercises in these notes are to assist your understanding of the subject and may
require time outside of the practice class to complete.
1. Complexity classes for simple classical algorithms
Algorithms are systematic set of instructions which when performed on an input data set,
produce an output data set. Algorithms are designed to solve computational problems on
computers. The efficiency of an algorithm is the measure of its execution time, and often
represented as a function f (n) of number of elementary steps n. The algorithms are
classified in Big O and Big Omega classes as you have learned in lecture 9.
In this section, you will practice how to compute f (n) for a given algorithm and how to
classify an algorithm defined by f (n) in terms of Big O and Big Omega notations.
Exercise 1.1 In lecture 9, you have learnt insertion sort algorithm which takes O(n2) steps
under the worst case to sort an array of “n” number of elements. Here, you are going to
analyse a slightly different sorting algorithm, as described below:
Input = An unsorted array of “n” integers.
Output = A sorted array with all elements arranged in ascending order.
Algorithm: repeatedly swap adjacent elements if they are in wrong order, i.e. left element
is larger than the right element. The algorithm exits when all elements are sorted, and no
swap between adjacent elements occurs.
Example Input array: 4, 3, 5
Algorithm steps:
4>3: swap 4 and 3 ® 3, 4, 5
4<5: no swap ® 3, 4, 5
Perform the above algorithm on the following input array. Show all steps.
Input array: 34, 45, 23, 87, 98, 12, 11, 89, 78, 56, 11
MULT20015 Practice Class-5, Ó L. Hollenberg et al 2021 2
The elementary step for the above algorithm is comparison between two elements of
array. Compute the worst-case cost i.e. f (n) of the algorithm:
What is the elementary step? ______________
How many elementary steps are required for an input array of size n in worst case?
What’s the Big O class for the above algorithm? _____________
What’s the Big Omega class for the above algorithm? _____________
Exercise 1.2 In this exercise, you will practice more about calculation of Big O and Big
Omega classes for given f (n) functions.
Recall: f (n) = O(g(n)) when for some c > 0 and large n0, f (n) ≤ c ´ g(n).
f (n) = Ω(g(n)) when for some c > 0 and large n0, f (n) ≥ c ´ g(n).
For each of the f (n) functions given below, find and plot g(n) and compute n0 and c.
f (n) = 9n + 5
f (n) = 3n2 + 106n + 1010
f (n) = nlog2(n) + n2
34, 23, 45, 87, 12, 11, 89, 78, 56, 11,
23, 34, 45, 12, 11, 87, 78, 56, 11,
23, 34, 12, 11, 45, 78, 56, 11,
87, 89, 98
23, 12, 11, 34, 45, 56, 11,
78, 87, 89, 98
12, 11, 23, 34, 45, 11,
56, 78, 87, 89, 98
11, 12, 23, 34, 11,
45, 56, 78, 87, 89, 98
11, 12, 23, 11,
34, 45, 56, 78, 87, 89, 98
11, 12, 11,
23, 34, 45, 56, 78, 87, 89, 98
12, 23, 34, 45, 56, 78, 87, 89, 98
11, 11, 12, 23, 34, 45, 56, 78, 87, 89, 98
Integer comparison
Notice after every cycle you can be sure that at least 1 more element joins the sorted list. Performing a cycle on an n element list takes n-1 comparisons. In the worst case you require n-1 cycles. We perform n-1 comparisons, then n-2 comparisons, then n-3 comparisons, … , then 1 comparison. This can be summed as:
elementary steps
When a sorted list is given as input.
MULT20015 Practice Class-5, Ó L. Hollenberg et al 2021 3
f (n) = 2n + n100
Note: try to make the bounds as tight as possible.
2. Deutsch-Jozsa Algorithm
Deutsch-Jozsa algorithm is a quantum algorithm which requires only one query to determine
if a function is constant or balanced. Classically, this task will require O(2n) queries. The
purpose of this section is to implement and understand Deutsch-Jozsa Algorithm on the
Quantum User Interface (QUI).
MULT20015 Practice Class-5, Ó L. Hollenberg et al 2021 4
Exercise 2.1
a) Program the Deutsch-Jozsa circuit in the QUI as per above and verify the algorithm
outputs for the four function types.
b) Examine the following circuit in the QUI – program the following circuit (make sure you
understand the X-basis states shown) and fill in the QUI states as indicated (ket/binary
representation). Can you see the working of the circuit in the QUI representation?
Exercise 2.2 For the case of a balanced function (case 4) extend the Deutsch-Jozsa circuit
coded in the QUI to multiple (two) qubits. Along the way ensure you understand how the
circuit is working by careful inspection of the states at each time step.
3. Simon’s Algorithm
Here we will implement a 3-bit example of finding 2-to-1 Boolean function, i.e. 𝑎: 𝑓(𝑥) =
𝑓(𝑥⨁𝑎) (where the addition is bitwise addition modulo 2), using Simon’s algorithm.
Exercise 3.1 Consider the following circuit which implements an oracle function 𝑓(𝑥) over
3-bit numbers, with a period a.
a) Program and run the circuit and fill in the table. By (classical) inspection, what is the
period a of the function we wish to determine (both bit and decimal forms)?
110 since f(000)=f(000 + 110)
circuit for one particular balanced function:
MULT20015 Practice Class-5, Ó L. Hollenberg et al 2021 5
b) Incorporate the oracle into a circuit in the QUI to determine the period using Simon’s
algorithm. Run the circuit several times to obtain three distinct integers (ya, yb, yc) in the
upper register. From the system of equations (as per schematic below) and solve by hand
(a classical step) to obtain the period a in bit form, and hence determine the decimal
(integer) form of a and compare with the classical solution above.
c) Run the time scrubber through the circuit and see if you can understand how it’s
Exercise 3.2 Here you will create another instance of a periodic function over 3 bits for
which you can apply Simon’s algorithm, essentially repeating the steps of Exercise 3.1.
Fill in the table for your function (left) and create the corresponding “oracle” circuit (right).
Code into the QUI and follow similar steps as in Exercise 3.1 above to extract the required
data from the QC to then classically solve for the period.
Exercise 3.3 See if you can create a 4-qubit instance (or even higher!).
note: do not use y=000
Repeat above for a 4 qubit x, f(x) table. You can make the function using a lot of multi-controlled X gates.
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