Do Bonds Span the Fixed Income Markets? Theory and Evidence for Unspanned Stochastic Volatility

Most term structure models assume bond markets are complete, that is, that all fixed income derivatives can be perfectly replicated using solely bonds. However, we find that, in practice, swap rates have limited explanatory power for returns on at-the-money straddles-portfolios mainly exposed to volatility risk. We term this empirical feature "unspanned stochastic volatility" (USV). While USV can be captured within an HJM framework, we demonstrate that bivariate models cannot exhibit USV We determine necessary and sufficient conditions for trivariate Markov affine systems to exhibit USV For such USV models, bonds alone may not be sufficient to identify all parameters. Rather, derivatives are needed.

[1]  W. Feller TWO SINGULAR DIFFUSION PROBLEMS , 1951 .

[2]  F. Black The pricing of commodity contracts , 1976 .

[3]  S. Richard An arbitrage model of the term structure of interest rates , 1978 .

[4]  T. C. Langetieg A Multivariate Model of the Term Structure , 1980 .

[5]  S. Ross,et al.  AN INTERTEMPORAL GENERAL EQUILIBRIUM MODEL OF ASSET PRICES , 1985 .

[6]  S. Ross,et al.  A theory of the term structure of interest rates'', Econometrica 53, 385-407 , 1985 .

[7]  D. Heath,et al.  Bond Pricing and the Term Structure of Interest Rates: A Discrete Time Approximation , 1990, Journal of Financial and Quantitative Analysis.

[8]  J. Hull Options, futures, and other derivative securities , 1989 .

[9]  Alan G. White,et al.  Pricing Interest-Rate-Derivative Securities , 1990 .

[10]  Oldrich A Vasicek,et al.  Fixed–income volatility management , 1991 .

[11]  Robert B. Litterman,et al.  Volatility and the Yield Curve , 1991 .

[12]  Robert B. Litterman,et al.  Common Factors Affecting Bond Returns , 1991 .

[13]  Eduardo S. Schwartz,et al.  Interest Rate Volatility and the Term Structure: A Two-Factor General Equilibrium Model , 1992 .

[14]  D. Duffie Dynamic Asset Pricing Theory , 1992 .

[15]  Campbell R. Harvey,et al.  An Empirical Comparison of Alternative Models of the Short-Term Interest Rate , 1992 .

[16]  Ren-Raw Chen,et al.  Maximum Likelihood Estimation for a Multifactor Equilibrium Model of the Term Structure of Interest Rates , 1993 .

[17]  S. Heston A Closed-Form Solution for Options with Stochastic Volatility with Applications to Bond and Currency Options , 1993 .

[18]  Andrew P. Carverhill WHEN IS THE SHORT RATE MARKOVIAN , 1994 .

[19]  Robert B. Litterman,et al.  Explorations into Factors Explaining Money Market Returns , 1994 .

[20]  D. P. Kennedy THE TERM STRUCTURE OF INTEREST RATES AS A GAUSSIAN RANDOM FIELD , 1994 .

[21]  A. Neuberger,et al.  The Log Contract , 1994 .

[22]  Peter H. Ritchken,et al.  VOLATILITY STRUCTURES OF FORWARD RATES AND THE DYNAMICS OF THE TERM STRUCTURE1 , 1995 .

[23]  Jacob Boudoukh,et al.  Pricing Mortgage-Backed Securities in a Multifactor Interest Rate Environment: A Multivariate Density Estimation Approach , 1995 .

[24]  Andrew Jeffrey,et al.  Single Factor Heath-Jarrow-Morton Term Structure Models Based on Markov Spot Interest Rate Dynamics , 1995, Journal of Financial and Quantitative Analysis.

[25]  D. Duffie,et al.  A Yield-factor Model of Interest Rates , 1996 .

[26]  R. Sundaram,et al.  A Simple Approach to Three-Factor Affine Term Structure Models , 1996 .

[27]  K. Kroner,et al.  Another Look at Models of the Short-Term Interest Rate , 1996, Journal of Financial and Quantitative Analysis.

[28]  T. Andersen,et al.  Estimating continuous-time stochastic volatility models of the short-term interest rate , 1997 .

[29]  R. Goldstein The Term Structure of Interest Rates as a Random Field , 2000 .

[30]  D. Duffie,et al.  An Econometric Model of the Term Structure of Interest-Rate Swap Yields , 1997 .

[31]  D. P. Kennedy Characterizing Gaussian Models of the Term Structure of Interest Rates , 1997 .

[32]  K. Singleton,et al.  Specification Analysis of Affine Term Structure Models , 1997 .

[33]  Olivier Ledoit,et al.  Relative Pricing of Options with Stochastic Volatility , 1998 .

[34]  D. Sornette,et al.  The Dynamics of the Forward Interest Rate Curve with Stochastic String Shocks , 1998, cond-mat/9801321.

[35]  D. Duffie,et al.  Modeling term structures of defaultable bonds , 1999 .

[36]  Eduardo S. Schwartz,et al.  Throwing Away a Billion Dollars: The Cost of Suboptimal Exercise Strategies in the Swaption Market , 1999 .

[37]  P. Santa-clara,et al.  The Dynamics of the Forward Interest Rate Curve: A Formulation with State Variables , 1999, Journal of Financial and Quantitative Analysis.

[38]  Eduardo S. Schwartz,et al.  The Relative Valuation of Caps and Swaptions: Theory and Empirical Evidence , 2000 .

[39]  Robert F. Dittmar,et al.  Quadratic Term Structure Models: Theory and Evidence , 2000 .

[40]  P. Collin‐Dufresne,et al.  On the term structure of default premia in the Swap and Libor markets , 2001 .

[41]  Quadratic Term Structure Models: Theory and Evidence , 2000 .

[42]  Leif Andersen,et al.  Factor Dependence of Bermudan Swaption Prices: Fact or Fiction? , 2000 .

[43]  J. Jackwerth,et al.  The Price of a Smile: Hedging and Spanning in Option Markets , 2001 .

[44]  Oren Cheyette,et al.  Markov Representation of the Heath-Jarrow-Morton Model , 2001 .

[45]  R. Goldstein,et al.  Stochastic Correlation and the Relative Pricing of Caps and Swaptions in a Generalized-Affine Framework , 2001 .

[46]  Liuren Wu,et al.  Are Interest Rate Derivatives Spanned by the Term Structure of Interest Rates? , 2001 .

[47]  Leif Andersen,et al.  Factor dependence of Bermudan swaptions: fact or fiction?☆ , 2001 .

[48]  Stephen M. Horan Throwing Away a Billion Dollars: The Cost of Suboptimal Exercise Strategies in the Swaptions Market , 2002 .

[49]  M. Musiela,et al.  Martingale Methods in Financial Modelling , 2002 .

[50]  D. Duffie,et al.  Affine Processes and Application in Finance , 2002 .