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Main Authors: Tangpi, Ludovic, Wang, Shichun
Format: Preprint
Published: 2023
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Online Access:https://arxiv.org/abs/2307.11340
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author Tangpi, Ludovic
Wang, Shichun
author_facet Tangpi, Ludovic
Wang, Shichun
contents In this paper we further extend the optimal bubble riding model proposed by Tangpi and Wang by allowing for price-dependent entry times. Agents are characterized by their individual entry threshold that represents their belief in the strength of the bubble. Conversely, the growth dynamics of the bubble is fueled by the influx of players. Price-dependent entry naturally leads to a mean field game of controls with common noise and random entry time, for which we provide an existence result. The equilibrium is obtained by first solving discretized versions of the game in the weak formulation and then examining the measurability property in the limit. In this paper, the common noise comes from two sources: the price of the asset which all agents trade, and also the exogenous bubble burst time, which we also discretize and incorporate into the model via progressive enlargement of filtration.
format Preprint
id arxiv_https___arxiv_org_abs_2307_11340
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle Optimal Bubble Riding with Price-dependent Entry: a Mean Field Game of Controls with Common Noise
Tangpi, Ludovic
Wang, Shichun
Mathematical Finance
In this paper we further extend the optimal bubble riding model proposed by Tangpi and Wang by allowing for price-dependent entry times. Agents are characterized by their individual entry threshold that represents their belief in the strength of the bubble. Conversely, the growth dynamics of the bubble is fueled by the influx of players. Price-dependent entry naturally leads to a mean field game of controls with common noise and random entry time, for which we provide an existence result. The equilibrium is obtained by first solving discretized versions of the game in the weak formulation and then examining the measurability property in the limit. In this paper, the common noise comes from two sources: the price of the asset which all agents trade, and also the exogenous bubble burst time, which we also discretize and incorporate into the model via progressive enlargement of filtration.
title Optimal Bubble Riding with Price-dependent Entry: a Mean Field Game of Controls with Common Noise
topic Mathematical Finance
url https://arxiv.org/abs/2307.11340