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MTH3025: Financial Mathematics Project
Project: Arbitrage
Arbitrage is a key concept in financial mathematics. In this project, you are expected
to consider some financial trading opportunities and identify, from the given data set, a
mispricing that can lead in turn to an arbitrage opportunity. Then you will have to report a
corresponding arbitrage strategy for returning a risk-free profit and estimate the magnitude
for the expected profit, both in written and in oral form.
1 Report (20% of module mark)
In the report, you will have to show the completion of three main tasks:
Financial instruments. You will have to explain in your own words what is meant
with the term arbitrage to someone with no prior knowledge of financial mathematics.
Then, you are also expected to explain what is meant with the following types of
financial instruments:
– Foreign-exchange swap.
– A rainbow option.
– A lookback option with floating strike price.
These financial instruments are not explained in the lectures. You are nevertheless
expected to explain these instruments in your own words following independent con-
sultation of external sources (to be duely acknowledged in your bibliography).
Misprice identification. For all the four given trading opportunities, you will have
to perform the necessary calculations in order to identify a mispricing in one of them.
Arbitrage strategy. You will have to describe the strategy that you can pursue to
make a risk-free profit. You will have to explain why you have chosen a particular
strategy, the asset(s) and derivative(s) to trade in, the investment that needs to be
made at present time, and what will happen to the portfolios at the maturity date
(final time).
The report should be typed and checked for originality through Turnitin. The submitted
file should be in PDF format. The expected length is no more than 5 pages (references
excluded), using a reasonable font-size and reasonable line spacing (e.g., as the present
document). Longer reports will be penalised.
The marking scheme adopted is the following:
Financial instruments: 30%.
Misprice identification: 30%.
Arbitrage strategy: 30%.
quality of the report (grammar, layout, clarity of exposition): 10%.
MTH3025: Financial Mathematics Project
2 Presentation (10% of module mark)
You will also be expected to explain your trading strategy to the lecturer via a presentation
that you have to upload on Canvas (via a separate upload with respect to the report, see
corresponding Assignment). The presentation should highlight the arbitrage strategy that
you would adopt to make a profit. It should explain what instruments you would prefer to
trade in, and what profit you expect to make. You do not need to include trade opportunities
that do not lead to a profit. The presentation should last between 5 and 8 minutes, and
be aimed at a third-year student in mathematics with no knowledge of financial mathematics.
The presentation will take the form of a Spoken PowerPoint or a pre-recorded video.
Your uploaded files should be readable with the tools available within the platform Of-
fice365, available via your QUB account, otherwise penalisations will be applied.
When you upload your presentation please add a comment that indicate the total duration
of your presentation.
Specific instructions about the presentation can be found on Canvas (in due time). The
marking scheme adopted is the following:
Quality of the slides (fonts, formulas, tables,…): 30%.
Quality of the presentation (timing, narrative, visual e?ects, voice, …): 30%.
Quality of the technical explanations (assets to trade in, arbitrage strategy, …): 40%.
MTH3025: Financial Mathematics Project
3 Data
A trader has access to the following four investment opportunities. One of them features a
significant misprice that needs to be identified. Once identified, an arbitrage strategy can
be devised to make a risk-free profit (see below for further guidance).
The trader also has access to bonds at the UK market interest rate at 0.67%.
Opportunity 1: Currency trading
On a currency market, the following currency exchange rates are listed.
GBP USD EUR CHF
1 GBP = 1.0000 1.2724 1.1491 1.3296
1 USD = 0.7859 1.0000 0.9031 1.0450
1 EUR = 0.8702 1.1072 1.0000 1.1638
1 CHF = 0.7521 0.9569 0.8592 1.0000
Opportunity 2: Futures for stocks with dividend
Futures are similar to forward contracts. However, futures are traded on an exchange. As-
sume that fair futures prices are equal to forward prices (see lecture notes Secs 4.8 and 4.9).
The following financial data for the supermarket sector was available on 1 February 2021.
The fair strike price for futures contracts is given for delivery of shares on 1 September 2021.
All prices are given in GBX (pence).
Share Value Dividend Payment date Futures
Tesco 217.58 1.75 1 May 216.68
Sainsbury’s 280.75 0.75 1 March 281.10
Morrisons 245.76 1.25 1 June 245.47
Opportunity 3: Futures for commodities with storage costs
The following financial data for trading in a variety of commodities was available on 1 January

  1. The fair strike price for the futures contracts is given for delivery of the commodity
    on 1 September 2021. All prices are given in GBP (pounds) per ounce. Storage costs are
    given per ounce for four months of storage and should be paid in advance.
    Spot price Storage cost per ounce Futures
    Gold 1093.22 8 1114.17
    Iridium 1179.09 6 1196.41
    Palladium 1032.11 5 1046.76
    Opportunity 4: Option portfolio trading
    The following financial data for FTSE-traded companies was available on 1 February 2021.
    All prices are given in GBX (pence). The option price listed is for European options that
    can be exercised exclusively on 1 July 2021 for the stated strike price. You may assume that
    no dividend is payable between 1 February and 1 July 2021.
    Share Value Call option Put option Strike price
    AstraZeneca 5725 352.64 411.47 5800
    Diageo 3025 197.87 264.22 3100
    Unilever 4260 260.23 288.25 4300
    MTH3025: Financial Mathematics Project
  2. Guidance about the report
    The report should contain the following elements:
    Your project number in the title.
    A short introduction.
    A first part (financial instruments) with an explanation of the term arbitrage and of
    the financial instruments listed on the first page.
    A second part (misprice identification) with an overview of the calculations carried
    out for all the four opportunities to identify the significant misprice in one of them
    (significant in this case means beyond rounding errors and leading to a risk-free profit
    via arbitrage above 2, see below).
    A third part (arbitrage strategy) in which you explain a possible arbitrage strategy,
    including an estimation of the expected risk-free profit.
    A short conclusion.
    A references section if deemed necessary.
    There is no need to include all data provided in this document in Sec. 3.
    The following points should be taken into account in your report:
    In opportunity 3, the trader can only buy or sell multiples of ounces.
    Regarding the first part (financial instruments) you should report the payo? (if rele-
    vant) of each financial instrument, the cost (if any) associated to the corresponding
    contract, and any additional information that you deem relevant and interesting to
    show your depth of understanding.
    Regarding the second part (misprice identification), you should present an overview
    of your calculations to prove that you have checked all the 4 opportunities, regardless
    where the arbitrage opportunity arises. For each opportunity, you do not need to repeat
    all the details of the calculations for all the cases; however, at least one representative
    case per opportunity should be analysed in full details.
    The arbitrage strategy needs to be self-financed, meaning that the trader does not
    need to invest their own money or assets. The trader can self-finance their arbitrage
    strategy constructing a portfolio by making as many financial transactions they desire
    at initial time. The transactions can consist of borrowing, buying, selling, exchanging
    and returning all the following: money (including di?erent currencies), stocks, futures,
    options, bonds, or any instrument you think is relevant. However each initial transac-
    tion should not exceed the value of 10000 and only one transaction at most of each
    type can be made. For example, only 10000 can be borrowed from a bank and only
    once; or only stocks up to the value of 10000 can be borrowed and they can be bor-
    rowed only once. Initial transactions can be assumed to be made instantaneously and
    without fees. With the constraints above, the significant misprice that you have
    identified in the second part should allow you to devise an arbitrage strategy to make
    a profit greater than 2.
    MTH3025: Financial Mathematics Project
    You can conclude the third part (arbitrage strategy) with observations showing your
    critical assessment of the strategy that you laid out, for example describing the short-
    comings due to the assumptions made when compared to a real-world scenario.
    There is no need to write numerical codes to complete this project but you can certainly
    do that and include them in your report. However, if you wish to do so, please ensure
    that your codes are properly commented.
    The report should be uploaded via Canvas in pdf format, with automatically embedded
    Turnitin check for plagiarism. You do not need to worry as long as your Turnitin
    percentage is below 30%. Reports above this threshold will be considered on a case-
    by-case basis but, in general, in the past also reports above that threshold did not
    present genuine plagiarism issues.
    The lecturer will be happy to answer possible questions that you might have either via email
    or during the tutorials. However, notice that for what concerns the third part of the report
    (arbitrage strategy) no specific indication will be given. It is expected that the student
    should be able to devise an arbitrage strategy using the material available (notes, tutorials
    and homework problems, as well as additional resources).
    Due to the substantial nature of this assessment and the large number of students (approxi-
    mately 1 hour is needed to mark and give feedback to each student’s work, and approximately
  3. studentes are enrolled), marks and feedback for the full project (thus including both re-
    port and presentation) is expected to be provided in 4 semester weeks from the deadline of
    the presentation — therefore by week 1 of the second semester.
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