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$\alpha$-robust utility maximization with intractable claims: A quantile optimization approach

Portfolio Management 2026-04-07 v1 Optimization and Control Mathematical Finance

Abstract

This paper studies an α\alpha-robust utility maximization problem where an investor faces an intractable claim -- an exogenous contingent claim with known marginal distribution but unspecified dependence structure with financial market returns. The α\alpha-robust criterion interpolates between worst-case (α=0\alpha=0) and best-case (α=1\alpha=1) evaluations, generalizing both extremes through a continuous ambiguity attitude parameter. For weighted exponential utilities, we establish via rearrangement inequalities and comonotonicity theory that the α\alpha-robust risk measure is law-invariant, depending only on marginal distributions. This transforms the dynamic stochastic control problem into a concave static quantile optimization over a convex domain. We derive optimality conditions via calculus of variations and characterize the optimal quantile as the solution to a two-dimensional first-order ordinary differential equation system, which is a system of variational inequalities with mixed boundary conditions, enabling numerical solution. Our framework naturally accommodates additional risk constraints such as Value-at-Risk and Expected Shortfall. Numerical experiments reveal how ambiguity attitude, market conditions, and claim characteristics interact to shape optimal payoffs.

Keywords

Cite

@article{arxiv.2604.04649,
  title  = {$\alpha$-robust utility maximization with intractable claims: A quantile optimization approach},
  author = {Xinyu Chen and Zuo Quan Xu},
  journal= {arXiv preprint arXiv:2604.04649},
  year   = {2026}
}

Comments

8 figures

R2 v1 2026-07-01T11:55:16.989Z