Financial Markets Operations Management (12 page)

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2.7.7 Summary of Exchange-Traded Derivatives

ETD products are predominantly futures and options contracts that have been created by derivatives exchanges and centrally cleared through a clearing house. These products are standardised in terms of underlying assets, exercise dates and trading – all elements of the product's contract specification.

These contracts are created as required by the users; there are no limits regarding total contracts. However, to gain an idea of the depth of the market, users need to know trading volumes and open interest. This information, together with opening, closing, highest and lowest prices, is published by the derivatives exchange that created the product.

For the final part of this chapter, we turn our attention to the second type of derivative – over-the-counter, or OTC, derivatives.

2.8 OTC DERIVATIVES
2.8.1 Introduction

Unlike exchange-traded derivatives, OTC derivatives are not created by an exchange with standardised contract specifications, trading rules, etc. Instead, OTC derivatives are privately negotiated between buyer and seller away from any exchange. This results in issues that have concerned the industry's regulators:

  • As the contracts are not cleared centrally, there is no central counterparty.
  • Each counterparty to a trade relies on the other party to perform, and as some OTC contracts can last for many years before termination, there is a high degree of counterparty risk involved.
  • As the contracts are not traded on an exchange, there has been no requirement to report trades.
  • OTC derivatives can be relatively straightforward in design and content; however, many are highly complex in structure with risks that are correspondingly complex.
  • The specification of OTC derivatives is established at the time of the trade. Nevertheless, the more “vanilla” contracts do follow basic templates.

This situation is changing. Due to pressure from the regulators, OTC contracts are migrating to central clearing systems, trades are expected to be reported (whether centrally cleared or not) and there is the possibility that trading itself might migrate to exchanges.

The big question concerns the more complex derivative structures (the exotic derivatives). As there is no central, exchange-published pricing, OTC derivatives can be very difficult to value. If the clearing houses do not understand the risks of the products and find it difficult to value them, they might decide not to clear them. Consequently, the usage of exotic derivatives could decrease or disappear altogether.

When we trade forward and swap products, we talk about a
notional amount
. With the exception of currency swaps, the notional amount is never exchanged – only the payments generated by the notional amount are exchanged.

A good source of information regarding notional amounts outstanding and gross market values of OTC derivatives can be found in the statistical annex of the Bank for International Settlements' “Quarterly Review”.
11
In the BIS Quarterly Review for December 2013, Table 19, “Amounts outstanding of over-the-counter (OTC) derivatives”, showed the amounts and values for the main risk categories given in
Table 2.49
.

TABLE 2.49
BIS – Amounts outstanding of OTC derivatives

Notional amounts outstanding
Gross market values
Risk Category /
 Jun
Dec
Jun
Dec
Jun
 Jun
Dec
Jun
Dec
Jun
Instrument
 2011
2011
2012
2012
2013
 2011
2011
2012
2012
2013
Total contracts
706,884
647,811
639,396
632,579
692,908
19,518
27,307
25,417
24,740
20,158
Foreign exchange contracts
64,698
63,381
66,672
67,358
73,121
2,336
2,582
2,240
2,304
2,424
   Forwards and forex swaps
31,113
30,526
31,395
31,718
34,421
777
919
771
803
953
   Currency swaps
22,228
22,791
24,156
25,420
24,654
1,227
1,318
1,184
1,247
1,131
   Options
11,358
10,065
11,122
10,220
14,046
332
345
285
254
339
Interest rate contracts
553,240
504,117
494,427
489,703
561,299
13,244
20,001
19,113
18,833
15,155
   Forward rate agreements
55,747
50,596
64,711
71,353
86,334
59
67
51
47
168
   Interest rate swaps
441,201
402,611
379,401
369,999
425,569
11,861
18,046
17,214
17,080
13,663
   Options
56,291
50,911
50,314
48,351
49,396
1,324
1,888
1,848
1,706
1,325
Equity-linked contracts
6,841
5,982
6,313
6,251
6,821
708
679
645
605
693
   Forwards and swaps
2,029
1,738
1,880
2,045
2,321
176
156
147
157
206
   Options
4,813
4,244
4,434
4,207
4,501
532
523
497
448
487
Commodity contracts
3,197
3,091
2,994
2,587
2,458
471
481
390
358
386
   Gold
468
521
523
486
461
50
75
61
53
30
   Other commodities
2,729
2,570
2,471
2,101
1,997
421
405
328
306
306
      Forwards and swaps
1,846
1,745
1,659
1,363
1,327
      Options
883
824
812
739
670
Credit default swaps
32,409
28,626
26,931
25,069
24,349
1,345
1,586
1,187
848
725
   Single-name instruments
18,105
16,865
15,566
14,309
13,135
854
958
715
527
430
   Multi-name instruments
14,305
11,761
11,364
10,760
11,214
490
628
472
321
295
      of which index products
12,473
10,514
9,731
9,663
10,170
Unallocated
46,498
42,613
42,059
41,611
24,860
1,414
1,978
1,842
1,792
775
Memorandum Item:
   Gross Credit Exposure
2,971
3,939
3,691
3,609
3,900

Source:
BIS Quarterly Review March 2014 (online). Available from
www.bis.org/publ/qtrpdf/r_qt1403.htm
. [Accessed Monday, 5 May 2014]

Interest rate contracts have by far the greatest number of notional amounts outstanding and gross market values, at USD 561,299 billion and USD 15,155 billion respectively.

2.8.2 Forwards

We will look at two examples of a forward contract:

  1. A forward rate agreement (FRA);
  2. A currency forward.

An FRA is an obligation to settle the difference between two interest rates calculated on a notional amount. FRAs are used by banks and corporates to hedge interest rate exposures. For example, you are the Treasurer of a corporate that wishes to borrow USD 10,000,000 for six months. If you wanted to borrow today, you would expect to pay the six-month spot rate. Suppose, though, you needed to borrow in three months' time (and not today); what is your risk? Answer: interest rates might rise over the next three months, making the cost of borrowing more expensive.

In order to buy protection against a rate rise, you buy an FRA at a price of 2.00% p.a. (the
fixed rate
) on the notional amount of USD 10,000,000. The price reflects the interest rate on a loan that starts in three months' time and has a term of six months – a 3x9 FRA (nine months less three months = six months).

In three months' time, you observe the spot six-month interest rate to be 2.50% p.a. (the
reference rate
). The rate has increased, as you had previously feared.

The difference in price is 0.50% p.a. (2.50% − 2.00%) and therefore, under the terms of the FRA, the seller pays this difference on the notional amount to the buyer. Once this amount has been paid, the FRA is finished with no further payments to make.

Intuitively, the seller would pay:

However, the amount payable is paid at the
start
of the six-month loan period and not at the
end
as would normally be the case in lending. In order to make an adjustment to correct this anomaly, the amount payable is discounted by the reference rate. In our example, the amount payable by the seller to you would therefore be USD 24,962.28:

This is assuming 182 actual days in the six-month period.

There are two observations to make:

  1. If you had wanted to borrow USD 10 million, you would borrow at the spot rate of 2.50% and receive the FRA difference. This would bring your cost down to almost 2.00%, i.e. the original fixed rate.
  2. If you simply wanted to speculate on the direction interest rates would go, you would receive the USD 24,962.28 as your winnings on the bet.

Although the payment is not settled until the start of the loan period (the
effective date
), both parties have an interest risk from the moment they enter into the transaction up to the effective date. To cover this risk, the FRA is revalued daily and the party at risk receives collateral. We will cover the topic of collateral later in the book.

In the above example, we used the notation 3×9 to denote the effective date and the termination date. See
Table 2.50
for further examples of this notation using LIBOR as the benchmark rate (we could equally have used another interbank rate depending on the circumstances).

TABLE 2.50
FRA notation using LIBOR

EffectiveDate
TerminationDate
InterestRate
Notation
 1 month
 4 months
3-LIBOR
1 × 4
 1 month
 7 months
6-LIBOR
1 × 7
 3 months
 6 months
3-LIBOR
3 × 6
 3 months
 9 months
6-LIBOR
3 × 9
 6 months
12 months
6-LIBOR
6 × 12
12 months
18 months
6-LIBOR
12 × 18

In summary, by entering into an FRA, you can lock in an interest rate to protect against an interest rate increase (as in our example). To do this, you would buy an FRA. Conversely, you can lock in an interest rate to protect against an interest rate decrease by selling an FRA.

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