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April 12, 2013 - April 13, 2026

Available Issues

April 12, 2013 - April 13, 2026

Computable Error Bounds of Laplace Inversion for Pricing Asian Options

Published Online:2 Nov 2018https://doi.org/10.1287/ijoc.2017.0805

References

  • Abate J, Whitt W (1992) The Fourier-series method for inverting transforms of probability distributions. Queueing Systems10(1–2):5–87.CrossrefGoogle Scholar
  • Abate J, Whitt W (1995) Numerical inversion of Laplace transforms of probability distributions. ORSA J. Comput. 7(1):36–43.LinkGoogle Scholar
  • Abate J, Choudhury G, Whitt W (2013) An introduction to numerical transform inversion and its application to probability models. Grassmann W, ed. Computational Probability, Chap. 8 (Springer, New York), 257–323.Google Scholar
  • Bernstein DS (2005) Matrix Mathematics: Theory, Facts, and Formulas with Applications to Linear Systems Theory (Princeton University Press, Princeton, NJ).Google Scholar
  • Cai N, Kou S (2012) Pricing Asian options under a hyper-exponential jump diffusion model. Oper. Res. 60(1):64–77.LinkGoogle Scholar
  • Cai N, Kou SG, Liu Z (2014a) A two-sided Laplace inversion algorithm with computable error bounds and its applications in financial engineering. Adv. Appl. Probab. 46(3):766–789.CrossrefGoogle Scholar
  • Cai N, Li C, Shi C (2014b) Closed-form expansions of discretely monitored Asian options in diffusion models. Math. Oper. Res. 39(3):789–822.LinkGoogle Scholar
  • Cai N, Song Y, Kou S (2015) A general framework for pricing Asian options under Markov processes. Oper. Res. 63(3):540–554.LinkGoogle Scholar
  • Carr P, Madan DB (1999) Option valuation using the fast Fourier transform. J. Comput. Finance 2(4):61–73.CrossrefGoogle Scholar
  • Cui Z, Lee C, Liu Y (2018) Single-transform formulas for pricing Asian options in a general approximation framework under Markov processes. Eur. J. Oper. Res. 266(3):1134–1139.CrossrefGoogle Scholar
  • Drekic S, Stanford DA (2001) Reducing delay in preemptive repeat priority queues. Oper. Res. 49(1):145–156.LinkGoogle Scholar
  • Eberlein E, Papapantoleon A (2005) Equivalence of floating and fixed strike Asian and lookback options. Stochastic Processes Appl. 115(1):31–40.CrossrefGoogle Scholar
  • Feng L, Lin X (2013a) Pricing Bermudan options in Lévy process models. SIAM J. Financial Math. 4(1):474–493.CrossrefGoogle Scholar
  • Feng L, Lin X (2013b) Inverting analytic characteristic functions and financial applications. SIAM J. Financial Math. 4(1):372–398.CrossrefGoogle Scholar
  • Feng L, Linetsky V (2008) Pricing discretely monitored barrier options and defaultable bonds in Lévy process models: A fast Hilbert transform approach. Math. Finance 18(3):337–384.CrossrefGoogle Scholar
  • Feng L, Linetsky V (2009) Computing exponential moments of the discrete maximum of a Lévy process and lookback options. Finance Stochastics 13(4):501–529.CrossrefGoogle Scholar
  • Fu M, Madan DB, Wang T (1999) Pricing continuous Asian options: A comparison of Monte Carlo and Laplace transform inversion methods. J. Comput. Finance 2(2):49–74.CrossrefGoogle Scholar
  • Fusai G (2004) Pricing Asian options via Fourier and Laplace transforms. J. Comput. Finance 7(3):87–106.CrossrefGoogle Scholar
  • Fusai G, Kyriakou I (2016) General optimized lower and upper bounds for discrete and continuous arithmetic Asian options. Math. Oper. Res. 41(2):531–559.LinkGoogle Scholar
  • Fusai G, Meucci A (2008) Pricing discretely monitored Asian options under Lévy processes. J. Banking Finance 32(10):2076–2088.CrossrefGoogle Scholar
  • Fusai G, Germano G, Marazzina D (2016) Spitzer identity, Wiener-Hopf factorization and pricing of discretely monitored exotic options. Eur. J. Oper. Res. 251(1):124–134.CrossrefGoogle Scholar
  • Fusai G, Marazzina D, Marena M (2011) Pricing discretely monitored Asian options by maturity randomization. SIAM J. Financial Math. 2(1):383–403.CrossrefGoogle Scholar
  • Fusai G, Marena M, Roncoroni A (2008) Analytical pricing of discretely monitored Asian-style options: Theory and application to commodity markets. J. Banking Finance 32(10):2033–2045.CrossrefGoogle Scholar
  • Geman H, Yor M (1993) Bessel processes, Asian options, and perpetuities. Math. Finance 3(4):349–375.CrossrefGoogle Scholar
  • Horn R, Johnson C (1985) Matrix Analysis (Cambridge University Press, Cambridge, UK).CrossrefGoogle Scholar
  • Kou SG (2008) Jump diffusion models for asset pricing in financial engineering. Birge J, Linetsky V, eds. Handbooks in OR and MS, Chap. 2 (Elsevier, Amsterdam), 73–116.Google Scholar
  • Li L, Zhang G (2017) Error analysis of finite difference and Markov chain approximations for option pricing. Math. Finance 28(3):877–919.CrossrefGoogle Scholar
  • Linetsky V (2004) Spectral expansions for Asian (average price) options. Oper. Res. 52(6):856–867.LinkGoogle Scholar
  • Mijatović A, Pistorius M (2013) Continuously monitored barrier options under Markov processes. Math. Finance 23(1):1–38.CrossrefGoogle Scholar
  • Mijatović A, Vidmar M, Jacka S (2014) Markov chain approximations for transition densities of Lévy processes. Electronic J. Probab. 19(7):1–37.Google Scholar
  • Novikov A, Kordzakhia N (2014) Lower and upper bounds for prices of Asian-type options. Proc. Steklov Inst. Math. 287(1):225–231.CrossrefGoogle Scholar
  • Ye GL (2008) Asian options versus vanilla options: A boundary analysis. J. Risk Finance 9(2):188–199.CrossrefGoogle Scholar
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