Constrained mean-variance investment-reinsurance under the Cramér-Lundberg model with random coefficients

arXiv - QuantFin - Portfolio Management Pub Date : 2024-06-15 DOI:arxiv-2406.10465

Xiaomin Shi, Zuo Quan Xu

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Abstract

In this paper, we study an optimal mean-variance investment-reinsurance problem for an insurer (she) under a Cram\'er-Lundberg model with random coefficients. At any time, the insurer can purchase reinsurance or acquire new business and invest her surplus in a security market consisting of a risk-free asset and multiple risky assets, subject to a general convex cone investment constraint. We reduce the problem to a constrained stochastic linear-quadratic control problem with jumps whose solution is related to a system of partially coupled stochastic Riccati equations (SREs). Then we devote ourselves to establishing the existence and uniqueness of solutions to the SREs by pure backward stochastic differential equation (BSDE) techniques. We achieve this with the help of approximation procedure, comparison theorems for BSDEs with jumps, log transformation and BMO martingales. The efficient investment-reinsurance strategy and efficient mean-variance frontier are explicitly given through the solutions of the SREs, which are shown to be a linear feedback form of the wealth process and a half-line, respectively.

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具有随机系数的克拉梅尔-伦德伯格模型下的受约束均值方差投资-再保险

本文研究了一个具有随机系数的 Cram\'er-Lundberg 模型下保险人（她）的最优均值-方差投资-再保险问题。在任何时候，保险人都可以购买再保险或获取新业务，并将其盈余投资于由无风险资产和多种风险资产组成的证券市场，但必须遵守一般的凸锥投资约束。我们将该问题简化为一个带跳跃的受约束随机线性二次控制问题，其解与部分耦合随机里卡提方程（SRE）系统相关。然后，我们致力于通过纯回向随机微分方程（BSDE）技术来确定 SREs 解的存在性和唯一性。我们借助近似程序、有跳跃的 BSDE 的比较定理、对数变换和 BMO 马丁格尔来实现这一目标。有效的投资-再保险策略和有效的均值-方差前沿通过 SRE 的解明确给出，并分别证明它们是财富过程的线性反馈形式和半线。

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 - Portfolio Management

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