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STABILITY OF THE UTILITY MAXIMIZATION PROBLEM WITH RANDOM ENDOWMENT IN INCOMPLETE MARKETS |
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| Authors: | Constantinos Kardaras Gordan Žitković |
| Affiliation: | 1. Boston University;2. University of Texas at Austin |
| Abstract: | We perform a stability analysis for the utility maximization problem in a general semimartingale model where both liquid and illiquid assets (random endowments) are present. Small misspecifications of preferences (as modeled via expected utility), as well as views of the world or the market model (as modeled via subjective probabilities) are considered. Simple sufficient conditions are given for the problem to be well posed, in the sense that the optimal wealth and the marginal utility‐based prices are continuous functionals of preferences and probabilistic views. |
| Keywords: | convex analysis convex duality illiquid assets incomplete markets mathematical finance random endowment semimartingales stability utility maximization utility‐based prices well‐posed problems |