Details

<b>Introduction xi</b> <p><b>1 Purpose and Structure of Financial Markets 1</b></p> <p>1.1 Overview of Financial Markets 1</p> <p>1.2 Risk Sharing 2</p> <p>1.3 Transactional Structure of Financial Markets 6</p> <p>1.4 Arbitrage: Pure Versus Relative Value 8</p> <p>1.5 Financial Institutions: Transforming Intermediaries vs Broker-Dealers 12</p> <p>1.6 Primary (Issuance) and Secondary (Resale) Markets 13</p> <p>1.7 Market Players: Hedgers vs Speculators 15</p> <p>1.8 Preview of the Book 18</p> <p>PART I RELATIVE VALUE BUILDING BLOCKS</p> <p><b>2 Spot Markets 23</b></p> <p>2.1 Bonds and Annual Bond Math 23</p> <p>2.1.1 Zero-Coupon Bond 23</p> <p>2.1.2 Coupon Bond 25</p> <p>2.1.3 Amortizing Bond 27</p> <p>2.1.4 Floating Rate Bond 28</p> <p>2.2 Intra-Year Compounding and Day-Count 30</p> <p>2.2.1 Intra-Year Compounding 30</p> <p>2.2.2 Day-Count 31</p> <p>2.2.3 Accrued Interest 33</p> <p>2.3 Term Structure of Interest Rates and the Discount Factor Bootstrap 34</p> <p>2.3.1 Term Structure 34</p> <p>2.3.2 Discount Factor Bootstrap 36</p> <p>2.3.3 Valuation of an Arbitrary Bond 36</p> <p>2.4 Interest Rate Risk: Duration and Convexity 39</p> <p>2.4.1 Duration 41</p> <p>2.4.2 Portfolio Duration 44</p> <p>2.4.3 Convexity 45</p> <p>2.4.4 Other Risk Measures 46</p> <p>2.5 Equity, Commodity, and Currency Math 47</p> <p>2.5.1 Equities 48</p> <p>2.5.2 Currencies 49</p> <p>2.6 Short Selling 51</p> <p>2.6.1 Buying on Margin 52</p> <p>2.6.2 Short Selling in a Margin Account 53</p> <p>2.6.3 Short Selling of Bonds 54</p> <p><b>3 Futures Markets 57</b></p> <p>3.1 Fundamentals of Futures and Forwards 57</p> <p>3.2 Futures Mechanics 59</p> <p>3.2.1 Physical Commodity Futures 59</p> <p>3.2.2 Interest Rate Futures 62</p> <p>3.2.3 Stock Index Futures 69</p> <p>3.2.4 Currency Futures and Forwards 70</p> <p>3.3 Cash-and-Carry Arbitrage 73</p> <p>3.3.1 Commodities 74</p> <p>3.3.2 Stock Indexes 76</p> <p>3.3.3 Currencies 79</p> <p>3.4 Futures Not Subject to Cash-and-Carry 81</p> <p>3.5 Yield Curve Construction with Interest Rate Futures 84</p> <p>3.5.1 Certainty Equivalence of Eurodollar Futures 85</p> <p>3.5.2 Forward Rate Agreements 86</p> <p>3.5.3 Building Spot Zeros 88</p> <p>3.5.4 Recovering the Forwards 91</p> <p>3.5.5 Including Repo Rates in the Calculation of the Forwards 93</p> <p><b>4 Swap Markets 95</b></p> <p>4.1 Fundamentals of Swaps 95</p> <p>4.1.1 The Dual Nature of Swaps 96</p> <p>4.1.2 Implication for Pricing and Hedging 96</p> <p>4.2 Interest Rate Swaps 97</p> <p>4.2.1 Definition of an Interest Rate Swap 97</p> <p>4.2.2 Valuation of Interest Rate Swaps 99</p> <p>4.2.3 Hedging of Interest Rate Swaps 101</p> <p>4.3 Cross-Currency Swaps 105</p> <p>4.3.1 Definition of a Fixed-for-Fixed Cross-Currency Swap 105</p> <p>4.3.2 Valuation and Settlement of Cross-Currency Swaps 107</p> <p>4.3.3 Cross-Currency Swaps as Packages of Off-Market FX Forwards 109</p> <p>4.3.4 Multicurrency and Combination Cross-Currency Swaps 110</p> <p>4.4 Equity, Commodity, and Exotic Swaps 112</p> <p>4.4.1 Equity Swaps 112</p> <p>4.4.2 Commodity Swaps 114</p> <p>4.4.3 Volatility Swaps 115</p> <p>4.4.4 Index Principal Swaps 116</p> <p><b>5 Options on Prices and Hedge-Based Valuation 119</b></p> <p>5.1 Call and Put Payoffs at Expiry 120</p> <p>5.2 Composite Payoffs at Expiry 122</p> <p>5.2.1 Straddles and Strangles 122</p> <p>5.2.2 Spreads and Combinations 123</p> <p>5.3 Option Values Prior to Expiry 126</p> <p>5.4 Options and Forwards, Risk Sharing and Put–Call Parity 127</p> <p>5.5 Currency Options 128</p> <p>5.6 Binomial Option Pricing 129</p> <p>5.6.1 One-Step Examples 129</p> <p>5.7 Black–Scholes Model and Extensions 141</p> <p>5.7.1 Black–Scholes with No Dividends 141</p> <p>5.7.2 Dividends 142</p> <p>5.7.3 Options on Currency Rates 143</p> <p>5.7.4 Black–Scholes Delta, Gamma, and Vega 144</p> <p>5.8 Residual Risk of Options: Gamma, Vega, and Volatility 145</p> <p>5.8.1 Implied Volatility 147</p> <p>5.8.2 Volatility Smiles and Skews 148</p> <p>5.9 A Real-Life Option Pricing Exercise 150</p> <p>5.9.1 Consistency Checks: Put–Call Parity, Black–Scholes, and Binomial 150</p> <p><b>6 Options on Non-Price Variables 155</b></p> <p>6.1 Black Models For Bond Price Options, Caps/Floors, and European Swaptions 156</p> <p>6.1.1 Options on Bond Prices 156</p> <p>6.1.2 Cap and Floor Definitions 158</p> <p>6.1.3 Relationship of Caps and Floors to FRAs and Swaps 159</p> <p>6.1.4 A Cap Application 160</p> <p>6.1.5 Pricing of Caps and Floors 163</p> <p>6.1.6 European Swaption Definitions 164</p> <p>6.1.7 Options to Cancel Swaps 165</p> <p>6.1.8 Relationship of Swaptions to Forward Swaps 165</p> <p>6.1.9 Pricing of European Swaptions 167</p> <p>6.1.10 Limitations of the Black Model 168</p> <p>6.2 Convexity-Adjusted Models For Libor Forwards, Quantos, and Constant Maturity Swaps 168</p> <p>6.2.1 Convexity Adjustment for Eurodollar Futures 169</p> <p>6.2.2 Convexity Adjustment for CMS Options 170</p> <p>6.2.3 Quanto Adjustments 171</p> <p>6.3 Arbitrage-Free Interest Rate Models 172</p> <p>6.3.1 Short Rate Models 173</p> <p>6.3.2 Trinomial Trees and Calibration 174</p> <p>6.3.3 The Heath–Jarrow–Morton Model and the LIBOR Market Model 176</p> <p>6.3.4 Bermudan Swaptions and Multifactor Models 180</p> <p>6.4 Exotic Interest Rate Options 181</p> <p>6.4.1 Periodic Caps 181</p> <p>6.4.2 Digitals and Ranges 181</p> <p><b>7 Default Risk and Credit Derivatives 183</b></p> <p>7.1 Credit Default Swaps 184</p> <p>7.1.1 Credit Default Swap 184</p> <p>7.1.2 No Arbitrage: CDS vs Corporate Bond Spread 185</p> <p>7.1.3 Bundled Single-Name Credit Derivatives 186</p> <p>7.2 A Constant Default Probability Model 190</p> <p>7.3 A Deterministic Credit Migration Model 193</p> <p>7.4 A Poisson Model of Single Issuer Default 195</p> <p>7.4.1 Poisson Distribution 195</p> <p>7.4.2 A Single Issuer Default Model 196</p> <p>7.4.3 Pricing a Credit Default Swap in a Single Issuer Default Model 198</p> <p>7.5 The Default Correlation of the Reference Issuer and the Protection Seller 199</p> <p>PART II CASH FLOW ENGINEERING</p> <p><b>8 Structured Finance 203</b></p> <p>8.1 A Simple Classification of Structured Notes 204</p> <p>8.2 Interest Rate and Yield Curve-Based Structured Products 206</p> <p>8.2.1 An Inverse Floater 206</p> <p>8.2.2 A Leveraged Inverse Floater 209</p> <p>8.2.3 A Capped Floater 211</p> <p>8.2.4 A Callable 211</p> <p>8.2.5 A Range Floater 212</p> <p>8.2.6 An Index Principal Swap 212</p> <p>8.3 Asset Class-Linked Notes 213</p> <p>8.3.1 Principal-Protected Equity-Linked Notes 213</p> <p>8.3.2 A (Rainbow) Multi-Asset-Linked Note 216</p> <p>8.3.3 Principal-At-Risk Notes and Commodity-Tracking ETNs 216</p> <p>8.4 Insurance Risk Structured Products 219</p> <p><b>9 Mortgage-Backed Securities 223</b></p> <p>9.1 Mortgage Financing Basics 224</p> <p>9.2 Prepayment Risk 226</p> <p>9.3 Mortgage Pass-Through Securities 227</p> <p>9.4 Collateralized Mortgage Obligations 232</p> <p>9.4.1 Sequential-Pay CMO 232</p> <p>9.4.2 Planned Amortization Class CMO 233</p> <p>9.4.3 Interest-only (IO) and Principal-only (PO) Classes 237</p> <p>9.5 Multiclass and Non-Vanilla CMOs 241</p> <p>9.5.1 A Multiclass PAC Structure with a PAC I/O and a Floater/Inverse Coupon Split 241</p> <p>9.5.2 Non-Accelerating Senior and Accrual Tranches in Sequential CMOs 242</p> <p><b>10 Collateralized Debt Obligations and Basket Credit Derivatives 243</b></p> <p>10.1 Collateralized Debt Obligations 243</p> <p>10.1.1 Cash CDO 244</p> <p>10.1.2 Synthetic CDO 246</p> <p>10.2 Basket Credit Derivatives 249</p> <p>10.2.1 First-to-Default Basket 249</p> <p>10.2.2 <i>N</i>th-to-Default Basket, Arbitrage Conditions, and Hedging 251</p> <p>10.2.3 Hedging of Basket Derivatives 252</p> <p>10.3 Copulas and the Modeling of Default Correlation 252</p> <p>10.3.1 A Gaussian Copula 254</p> <p>10.3.2 General Copula Models 255</p> <p>10.4 Synthetic CDO Tranche Pricing and Loss Analysis 256</p> <p>10.4.1 Synthetic CDO Revisited 256</p> <p>10.4.2 Synthetic CDO Pricing and Expected Loss 257</p> <p>10.4.3 Synthetic CDO – Loss Rates, Ratings and the Crisis of 2008 259</p> <p>10.5 Credit Derivative Indexes 260</p> <p>PART III THE PLAYERS</p> <p><b>11 Individual Investors: A Survey of Modern Investment Theory 265</b></p> <p>11.1 A Brief History of Investment Thought 266</p> <p>11.2 Free Cash Flow Valuation of Companies 269</p> <p>11.2.1 Free Cash Flow Definitions 270</p> <p>11.2.2 Growth and the Discounting of the Cash Flows 273</p> <p>11.2.3 Terminal Multiple Models of Cash Flow Discounting 274</p> <p>11.3 The Modern Portfolio Theory and the CAPM 276</p> <p>11.3.1 Diversification and the Efficient Frontier 276</p> <p>11.3.2 Two-Fund Separation 278</p> <p>11.3.3 Systematic Risk and the CAPM 279</p> <p>11.3.4 Using the CAPM as a Stock Screen to Discover Alpha 280</p> <p>11.4 Multifactor Index Models 282</p> <p>11.4.1 The Fama–French Three-Factor Model 283</p> <p>11.4.2 The Carhart Fourth Factor: the Momentum 283</p> <p>11.4.3 International Index Factors 284</p> <p>11.5 Fundamental Indexing 284</p> <p>11.5.1 A Brief History of Fundamental Indexing 285</p> <p>11.5.2 Fundamental Indexing and Rebalancing 285</p> <p>11.5.3 Tactical Asset Allocation 286</p> <p>11.5.4 Fundamentally Indexed US Funds 286</p> <p><b>12 Hedge Funds: Alpha, Beta, and Strategy Indexes 287</b></p> <p>12.1 Hedge Fund Strategies 289</p> <p>12.1.1 Relative Asset Value Funds 289</p> <p>12.1.2 Relative Corporate/Credit Structure 292</p> <p>12.1.3 Theoretical Relative Value 294</p> <p>12.1.4 Statistical Relative Value Arbitrage 296</p> <p>12.2 Portable Alpha and Market-Neutral Plays 298</p> <p>12.3 Hedge Fund Replication and Strategy Indexes 299</p> <p><b>13 Banks: Asset-Liability Management 303</b></p> <p>13.1 Bank Balance Sheets and Income Statements 305</p> <p>13.2 Interest-Sensitive Gap Management 313</p> <p>13.3 Duration Gap Management 320</p> <p>13.4 Value at Risk 322</p> <p><b>14 Private Equity, Pension, and Sovereign Funds 329</b></p> <p>14.1 Private Equity 329</p> <p>14.1.1 Investment in Private Equity – Limited Partnership Funds 330</p> <p>14.1.2 Leverage Buyouts 331</p> <p>14.1.3 Private Equity Lending – Mezzanine Capital and Distressed Loans 332</p> <p>14.1.4 Other Forms of Private Equity – PIPEs 333</p> <p>14.1.5 Venture Capital 333</p> <p>14.1.6 Exit Strategies – IPOs and Secondary Sales 334</p> <p>14.2 Risk Allocation for Pension Funds and Sovereign Funds 335</p> <p>14.2.1 Defined Benefit Pension Funds and Endowments 335</p> <p>14.2.2 The Risk Budget Allocation Process 336</p> <p>Acknowledgment 338</p> <p><b>References 339</b></p> <p><b>Index 343</b></p>

<b>ROBERT DUBIL</b> has been an Associate Professor in the finance department at the University of Utah since 2005. Prior to this he was Chief Strategist at HedgeStreet where he also wrote a blog as Dr Bob, and has held positions at UBS as Head of Quantitative Research and Fixed Income Options Trading; Chase Manhattan as Head of Exotics; Merrill Lynch as a Fixed Income Derivatives Trader, and latter as Director of Analytics in the Corporate Risk Management Group; Nomura; and J.P. Morgan. Professor Dubil holds a PhD and MBA from the University of Connecticut and an MA from Wharton. He published <i>An Arbitrage Guide to Financial Markets</i> (John Wiley & Sons, Ltd) in 2004 and has written a number of book chapters and articles on liquidity, derivatives and personal finance that have appeared in the <i>Journal of Applied Finance</i>, <i>Financial Services Review</i>, <i>Journal of Wealth Management</i>, <i>Journal of Investing</i>, and the <i>Journal of Financial Planning</i>. In Robert’s spare time he enjoys piano, skiing the greatest snow on earth and tennis. His second serve could use a lot of improvement though.

A whole is worth the sum of its parts. Even the most complex structured bond, credit arbitrage strategy or hedge trade can be broken down into its component parts, and if we understand the elemental components, we can then value the whole as the sum of its parts. We can quantify the risk that is hedged and the risk that is left as the residual exposure. If we learn to view all financial trades and securities as engineered packages of building blocks, then we can analyze in which structures some parts may be cheap and some may be rich. It is this relative value arbitrage principle that drives all modern trading and investment. <p>This book is an easy-to-understand guide to the complex world of today’s financial markets teaching you what money and capital markets are about through a sequence of arbitrage-based numerical illustrations and exercises enriched with institutional detail. Filled with insights and real life examples from the trading floor, it is essential reading for anyone starting out in trading.</p> <p>Using a unique structural approach to teaching the mechanics of financial markets, the book dissects markets into their common building blocks: spot (cash), forward/futures, and contingent (options) transactions. After explaining how each of these is valued and settled, it exploits the structural uniformity across all markets to introduce the difficult subjects of financially engineered products and complex derivatives.</p> <p>The book avoids stochastic calculus in favour of numeric cash flow calculations, present value tables, and diagrams, explaining options, swaps and credit derivatives without any use of differential equations.</p>

GB