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Algorithmic Hessians and the Fast Computation of Cross-Gamma RiskMark S. JoshiUniversity of Melbourne - Centre for Actuarial Studies Chao YangUniversity of Melbourne - Centre for Actuarial Studies June 18, 2010 Abstract: We introduce a new methodology for computing Hessians from algorithms for function evaluation, using backwards methods. We show that the complexity of the Hessian calculation is a linear function of the number of state variables times the complexity of the original algorithm. We apply our results to computing the Gamma matrix of multi-dimensional financial derivatives including Asian Baskets and cancellable swaps. In particular, our algorithm for computing Gammas of Bermudan cancellable swaps is order O(n^2) per step in the number of rates. We present numerical results demonstrating that the computing all n(n 1)/2 Gammas in the LMM takes roughly n/3 times as long as computing the price.
Number of Pages in PDF File: 21 Keywords: automatic differentiation, Monte Carlo simulation, Greeks, Gamma, LIBOR market model, cancellable JEL Classification: G13 working papers seriesDate posted: June 19, 2010 ; Last revised: December 2, 2010Suggested Citation |
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