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{{Short description|Forex arbitrage across three currencies}}
'''Triangular arbitrage''' (also referred to as '''cross currency arbitrage''' or '''three-point arbitrage''') is the act of exploiting an [[arbitrage]] opportunity resulting from a pricing discrepancy among three different [[currency|currencies]] in the [[foreign exchange market]].<ref name="Carbaugh 2005">{{Cite book | title = International Economics, 10th Edition | author = Carbaugh, Robert J. | year = 2005 | publisher = Thomson South-Western | ___location = Mason, OH | isbn = 978-0-324-52724-7}}</ref><ref name="Pilbeam 2006">{{Cite book | title = International Finance, 3rd Edition | author = Pilbeam, Keith | year = 2006 | publisher = Palgrave Macmillan | ___location = New York, NY | isbn = 978-1-4039-4837-3}}</ref><ref name="Aiba et al. 2002">{{Cite journal | title = Triangular arbitrage as an interaction among foreign exchange rates | journal = Physica A: Statistical Mechanics and
==Cross exchange rate discrepancies==
Triangular arbitrage opportunities may only exist when a [[bank]]'s quoted exchange rate is not equal to the market's implicit cross exchange rate. The following equation represents the calculation of an implicit cross exchange rate, the exchange rate one would expect in the market as implied from the ratio of two currencies other than the base currency.<ref name="Feenstra & Taylor 2008">{{Cite book | title = International Macroeconomics | author = Feenstra, Robert C. | author2 = Taylor, Alan M. | year = 2008 | publisher = Worth Publishers | ___location = New York, NY | isbn = 978-1-4292-0691-4 | url-access = registration | url = https://archive.org/details/internationaleco0000feen }}</ref><ref name="Levi 2005">{{Cite book | title = International Finance, 4th Edition | author = Levi, Maurice D. | year = 2005 | publisher = Routledge | ___location = New York, NY | isbn = 978-0-415-30900-4}}</ref>
:<math>S_{a/\$} = S_{a/b} S_{b/\$}</math>
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==Mechanics of triangular arbitrage==
[[File:Triangular-arbitrage.svg|thumb|right|A visual representation of a realistic triangular arbitrage scenario, using sample bid and ask prices quoted by international banks
Some international banks serve as [[market maker]]s between currencies by narrowing their [[
For example, [[Citibank]] detects that [[Deutsche Bank]] is quoting dollars at a [[bid price]] of
# Citibank sells $5,000,000 to Deutsche Bank for euros, receiving €4,085,500. ($5,000,000 ×
# Citibank sells €4,085,500 to Crédit Agricole for pounds, receiving £3,430,311. (€4,085,500 ÷
# Citibank sells £3,430,311 to Barclays for dollars, receiving $5,025,406. (£3,430,311 × $1.4650
# Citibank ultimately earns an arbitrage profit of $25,406 on the $5,000,000 of capital it used to execute the strategy.
The reason for dividing the euro amount by the euro/pound exchange rate in this example is that the exchange rate is quoted in euro terms, as is the amount being traded. One could multiply the euro amount by the reciprocal pound/euro exchange rate and still calculate the ending amount of pounds.
==Evidence for triangular arbitrage==
Research examining high-frequency exchange rate data has found that [[mispricing]]s do occur in the foreign exchange market such that executable triangular arbitrage opportunities appear possible.<ref name="Fenn et al. 2009">{{Cite journal | title = The Mirage of Triangular Arbitrage in the Spot Foreign Exchange Market | journal = International Journal of Theoretical and Applied Finance | volume = 12 | issue = 8 | year = 2009 | pages = 1105–1123 | author = Fenn, Daniel J. | author2 = Howison, Sam D. | author3 = McDonald, Mark | author4 = Williams, Stacy | author5 = Johnson, Neil F. |
Tests for [[seasonality]] in the amount and duration of triangular arbitrage opportunities have shown that incidence of arbitrage opportunities and mean duration is consistent from day to day. However, significant variations have been identified during different times of day. Transactions involving the JPY and CHF have demonstrated a smaller number of opportunities and long average duration around 01:00 and 10:00 [[UTC]], contrasted with a greater number of opportunities and short average duration around 13:00 and 16:00 UTC. Such variations in incidence and duration of arbitrage opportunities can be explained by variations in [[market liquidity]] during the [[trading day]]. For example, the foreign exchange market is found to be most liquid for Asia around 00:00 and 10:00 UTC, for Europe around 07:00 and 17:00 UTC, and for America around 13:00 and 23:00 UTC. The overall foreign exchange market is most liquid around 08:00 and 16:00 UTC, and the least liquid around 22:00 and 01:00 UTC. The periods of highest liquidity correspond with the periods of greatest incidence of opportunities for triangular arbitrage. This correspondence is substantiated by the observation of narrower bid-ask spreads during periods of high liquidity, resulting in a greater potential for mispricings and therefore arbitrage opportunities. However, market forces are driven to correct for mispricings due to a high frequency of trades that will trade away fleeting arbitrage opportunities.<ref name="Fenn et al. 2009" />
Researchers have shown a decrease in the incidence of triangular arbitrage opportunities from 2003 to 2005 for the Japanese yen and Swiss franc and have attributed the decrease to broader adoption of [[electronic trading platform]]s and [[algorithmic trading|trading algorithms]] during the same period. Such electronic systems have enabled traders to trade and react rapidly to price changes. The speed gained from these technologies improved trading efficiency and the correction of mispricings, allowing for less incidence of triangular arbitrage opportunities.<ref name="Fenn et al. 2009" />
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Mere existence of triangular arbitrage opportunities does not necessarily imply that a trading strategy seeking to exploit currency mispricings is consistently profitable. [[Electronic trading]] systems allow the three constituent trades in a triangular arbitrage transaction to be submitted very rapidly. However, there exists a delay between the identification of such an opportunity, the initiation of trades, and the arrival of trades to the party quoting the mispricing. Even though such delays are only milliseconds in duration, they are deemed significant. For example, if a trader places each trade as a [[limit order]] to be filled only at the arbitrage price and a price moves due to market activity or new price is quoted by the third party, then the triangular transaction will not be completed. In such a case, the arbitrageur will face a cost to close out the position that is equal to the change in price that eliminated the arbitrage condition.<ref name="Fenn et al. 2009" />
In the foreign exchange market, there are many market participants competing for each arbitrage opportunity; for arbitrage to be profitable, a trader would need to identify and execute each arbitrage opportunity faster than competitors. Competing arbitrageurs are expected to persist in striving to increase their execution speed of trades by engaging in what some researchers describe as an "electronic trading 'arms race'."<ref name="Fenn et al. 2009" /> The costs involved in keeping ahead in such a competition present difficulty in consistently beating other arbitrageurs over the long term. Other factors such as [[transaction costs]], [[brokerage]] fees, network access fees, and sophisticated electronic trading platforms further challenge the feasibility of significant arbitrage profits over prolonged periods.<ref name="Fenn et al. 2009" />
==See also==
* [[Covered interest arbitrage]]
* [[Uncovered interest arbitrage]]
*[[Arbitrage]]
==References==
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