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Monotone 2D Integration Scheme for Mean-CVaR Optimization via Fourier-Trained Transition Kernels

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  • Duy-Minh Dang
  • Hao Zhou

Abstract

We present a strictly monotone, provably convergent two-dimensional (2D) integration method for multi-period mean-conditional value-at-risk (mean-CVaR) reward-risk stochastic control in models whose one-step increment law is specified via a closed-form characteristic function (CF). When the transition density is unavailable in closed form, we learn a nonnegative, normalized 2D transition kernel in Fourier space using a simplex-constrained Gaussian-mixture parameterization, and discretize the resulting convolution integrals with composite quadrature rules with nonnegative weights to guarantee monotonicity. The scheme is implemented efficiently using 2D fast Fourier transforms. Under mild Fourier-tail decay assumptions on the CF, we derive Fourier-domain $L_2$ kernel-approximation and truncation error estimates and translate them into real-space bounds that are used to establish $\ell_\infty$-stability, consistency, and pointwise convergence as the discretization and kernel-approximation parameters vanish. Numerical experiments for a fully coupled 2D jump--diffusion model in a multi-period portfolio optimization setting illustrate robustness and accuracy.

Suggested Citation

  • Duy-Minh Dang & Hao Zhou, 2026. "Monotone 2D Integration Scheme for Mean-CVaR Optimization via Fourier-Trained Transition Kernels," Papers 2603.26291, arXiv.org.
    • Handle: RePEc:arx:papers:2603.26291
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    References listed on IDEAS

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    1. Zhang, Hanwen & Dang, Duy-Minh, 2024. "A monotone numerical integration method for mean–variance portfolio optimization under jump-diffusion models," Mathematics and Computers in Simulation (MATCOM), Elsevier, vol. 219(C), pages 112-140.
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    4. Dang, D.M. & Forsyth, P.A., 2016. "Better than pre-commitment mean-variance portfolio allocation strategies: A semi-self-financing Hamilton–Jacobi–Bellman equation approach," European Journal of Operational Research, Elsevier, vol. 250(3), pages 827-841.
    5. Duy-Minh Dang & Hao Zhou, 2024. "A monotone piecewise constant control integration approach for the two-factor uncertain volatility model," Papers 2402.06840, arXiv.org, revised Jun 2025.
    6. Duy-Minh Dang & Chang Chen, 2025. "Multi-period Mean-Buffered Probability of Exceedance in Defined Contribution Portfolio Optimization," Papers 2505.22121, arXiv.org, revised Feb 2026.
    7. Aharon Ben‐Tal & Marc Teboulle, 2007. "An Old‐New Concept Of Convex Risk Measures: The Optimized Certainty Equivalent," Mathematical Finance, Wiley Blackwell, vol. 17(3), pages 449-476, July.
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    11. Hao Zhou & Duy-Minh Dang, 2024. "Numerical analysis of American option pricing in a two-asset jump-diffusion model," Papers 2410.04745, arXiv.org, revised Apr 2025.
    12. Marjon Ruijter & Kees Oosterlee, 2012. "Two-dimensional Fourier cosine series expansion method for pricing financial options," CPB Discussion Paper 225, CPB Netherlands Bureau for Economic Policy Analysis.
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