Research article

Analytical formulae for variance and volatility swaps with stochastic volatility, stochastic equilibrium level and regime switching

  • Received: 11 June 2024 Revised: 05 July 2024 Accepted: 08 July 2024 Published: 16 July 2024
  • MSC : 91G20

  • The CIR stochastic volatility model is modified to introduce nonlinear mean reversion, with the long-run volatility average as a random variable controlled by two parts being modeled through a Brownian motion and a Markov chain, respectively. This model still possesses an analytical formulation of the forward characteristic function, from which we establish variance swap prices as well as volatility swap ones with a nonlinear payoff in closed form. The numerical implementation of the two formulae demonstrates the significant impact of regime switching.

    Citation: Xin-Jiang He, Sha Lin. Analytical formulae for variance and volatility swaps with stochastic volatility, stochastic equilibrium level and regime switching[J]. AIMS Mathematics, 2024, 9(8): 22225-22238. doi: 10.3934/math.20241081

    Related Papers:

  • The CIR stochastic volatility model is modified to introduce nonlinear mean reversion, with the long-run volatility average as a random variable controlled by two parts being modeled through a Brownian motion and a Markov chain, respectively. This model still possesses an analytical formulation of the forward characteristic function, from which we establish variance swap prices as well as volatility swap ones with a nonlinear payoff in closed form. The numerical implementation of the two formulae demonstrates the significant impact of regime switching.



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