Nonconcave Robust Utility Maximization under Projective Determinacy

arXiv - QuantFin - Mathematical Finance Pub Date : 2024-03-18 DOI:arxiv-2403.11824

Laurence Carassus, Massinissa Ferhoune

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Abstract

We study a robust utility maximization problem in a general discrete-time frictionless market. The investor is assumed to have a random, nonconcave and nondecreasing utility function, which may or may not be finite on the whole real-line. She also faces model ambiguity on her beliefs about the market, which is modeled through a set of priors. We prove, using only primal methods, the existence of an optimal investment strategy when the utility function is also upper-semicontinuous. For that, we introduce the new notion of projectively measurable functions. We show basic properties of these functions as stability under sums, differences, products, suprema, infima and compositions but also assuming the set-theoretical axiom of Projective Determinacy (PD) stability under integration and existence of $\epsilon$-optimal selectors. We consider projectively measurable random utility function and price process and assume that the graphs of the sets of local priors are projective sets. Our other assumptions are stated on a prior-by-prior basis and correspond to generally accepted assumptions in the literature on markets without ambiguity.

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投影确定性下的非凹鲁棒性效用最大化

我们研究的是一般离散时间无限制市场中的稳健效用最大化问题。假设投资者有一个随机的、非凹陷的、非递减的效用函数，这个函数在整条直线上可能是有限的，也可能不是。投资者还面临着对市场信念的模型模糊性，这种模糊性是通过一组先验来模拟的。当效用函数也是上micontinuous 时，我们仅使用基元方法证明了最优投资策略的存在。为此，我们引入了 "可测函数"（projectively measurable functions）这一新概念。我们展示了这些函数的基本性质，如在和、差、积、上等、下等和组合下的稳定性，同时也假设了集合论公理投影决定性（PD）在积分下的稳定性和最优选择器的存在性。我们考虑投影可测的随机效用函数和价格过程，并假设局部先验集的图是投影集。我们的其他假设是在逐个先验的基础上提出的，与市场文献中普遍接受的假设相对应，没有歧义。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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arXiv - QuantFin - Mathematical Finance

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