Arbitrage Bounds for Prices of Weighted Variance Swaps

We develop robust pricing and hedging of a weighted variance swap when market prices for a finite number of co--maturing put options are given. We assume the given prices do not admit arbitrage and deduce no-arbitrage bounds on the weighted variance swap along with super- and sub- replicating strategies which enforce them. We find that market quotes for variance swaps are surprisingly close to the model-free lower bounds we determine. We solve the problem by transforming it into an analogous question for a European option with a convex payoff. The lower bound becomes a problem in semi-infinite linear programming which we solve in detail. The upper bound is explicit. We work in a model-independent and probability-free setup. In particular we use and extend F\"ollmer's pathwise stochastic calculus. Appropriate notions of arbitrage and admissibility are introduced. This allows us to establish the usual hedging relation between the variance swap and the 'log contract' and similar connections for weighted variance swaps. Our results take form of a FTAP: we show that the absence of (weak) arbitrage is equivalent to the existence of a classical model which reproduces the observed prices via risk-neutral expectations of discounted payoffs.

[1]  Jan Oblój,et al.  Robust pricing and hedging of double no-touch options , 2009, Finance Stochastics.

[2]  K. Isii The extrema of probability determined by generalized moments (I) bounded random variables , 1960 .

[3]  H. Föllmer,et al.  Robust Preferences and Robust Portfolio Choice , 2009 .

[4]  Walter Willinger,et al.  Dynamic spanning without probabilities , 1994 .

[5]  Terry Lyons,et al.  Uncertain volatility and the risk-free synthesis of derivatives , 1995 .

[6]  Hans Föllmer,et al.  Calcul d'ito sans probabilites , 1981 .

[7]  W. J. Studden,et al.  Tchebycheff Systems: With Applications in Analysis and Statistics. , 1967 .

[8]  Dieter Sondermann,et al.  Introduction to stochastic calculus for finance : a new didactic approach , 2006 .

[9]  F. Delbaen,et al.  A general version of the fundamental theorem of asset pricing , 1994 .

[10]  Vladimir Vovk,et al.  Continuous-time trading and the emergence of probability , 2009, Finance and Stochastics.

[11]  David Hobson,et al.  Robust hedging of the lookback option , 1998, Finance Stochastics.

[12]  Jan Ob lój The Skorokhod embedding problem and its offspring ∗ , 2004 .

[13]  Mark H. A. Davis,et al.  THE RANGE OF TRADED OPTION PRICES , 2007 .

[14]  M. Yor,et al.  Continuous martingales and Brownian motion , 1990 .

[15]  Martin Klimmek,et al.  Model-independent hedging strategies for variance swaps , 2012, Finance Stochastics.

[16]  D. Sondermann Introduction to stochastic calculus for finance , 2006 .

[17]  Mark H. A. Davis,et al.  Variance Derivatives: Pricing and Convergence , 2012 .

[18]  Rama Cont Model Uncertainty and its Impact on the Pricing of Derivative Instruments , 2004 .

[19]  Hans Föllmer,et al.  Risk assessment for uncertain cash flows: model ambiguity, discounting ambiguity, and the role of bubbles , 2010, Finance Stochastics.

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

[21]  Lars Peter Hansen,et al.  Wanting robustness in macroeconomics , 2010 .

[22]  Jan Oblój,et al.  Robust Hedging of Double Touch Barrier Options , 2008, SIAM J. Financial Math..

[23]  Klaus Glashoff Duality theory of semi-infinite programming , 1979 .

[24]  Jim Gatheral The Volatility Surface: A Practitioner's Guide , 2006 .

[25]  J. Obłój The Skorokhod embedding problem and its offspring , 2004, math/0401114.