Robust utility maximization for a diffusion market model with misspecified coefficients

Tevzadze, R.; Toronjadze, T.; Uzunashvili, T.

doi:10.1007/s00780-012-0199-7

Cited by 40 publications

(35 citation statements)

References 39 publications

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“…More recently, the non-dominated problem has also been studied in various contexts. For instance, [35] investigated a compact set of possible drift and volatility coefficients and tackled the robust problem by solving an associated Hamilton-Jacobi-Bellman equation. In [24], where volatility coefficients are uncertain over a compact set and the drift is known, the theory of BSDEs is applied.…”

Section: Introductionmentioning

confidence: 99%

Robust utility maximisation in markets with transaction costs

Chau

Rásonyi

2019

Finance Stoch

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Section: Introductionmentioning

confidence: 99%

Robust utility maximisation in markets with transaction costs

Chau

Rásonyi

2019

Finance Stoch

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“…Likewise, we are aware of only few recent articles on the related problem of expected utility maximization under uncertainty about both drifts and volatilities (cf. Tevzadze et al 2013;Biagini and Pınar 2017;Neufeld and Nutz 2016) some of which achieve quite explicit results for models with specific parametric structure. Among many interesting contributions on utility optimization under only one type of uncertainty, see for instance Chen and Epstein (2002), Quenez (2004), Garlappi et al (2007), Schied (2007) or Øksendal and Sulem (2014) for (dominated) uncertainty solely about drifts, or Matoussi et al (2015) and Hu et al (2014b) for ambiguity solely about volatilities but not about drifts.…”

Section: Introductionmentioning

confidence: 99%

Good deal hedging and valuation under combined uncertainty about drift and volatility

Kentia

2017

Probab Uncertain Quant Risk

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which permits unrestricted use, distribution, and reproduction in any medium, provided you give appropriate credit to the original author(s) and the source, provide a link to the Creative Commons license, and indicate if changes were made. AbstractWe study robust notions of good-deal hedging and valuation under combined uncertainty about the drifts and volatilities of asset prices. Good-deal bounds are determined by a subset of risk-neutral pricing measures such that not only opportunities for arbitrage are excluded but also deals that are too good, by restricting instantaneous Sharpe ratios. A non-dominated multiple priors approach to model uncertainty (ambiguity) leads to worst-case good-deal bounds. Corresponding hedging strategies arise as minimizers of a suitable coherent risk measure. Good-deal bounds and hedges for measurable claims are characterized by solutions to secondorder backward stochastic differential equations whose generators are non-convex in the volatility. These hedging strategies are robust with respect to uncertainty in the sense that their tracking errors satisfy a supermartingale property under all a-priori valuation measures, uniformly over all priors.Keywords Combined drift and volatility uncertainty · Good-deal bounds · Robust hedging · Hedging to acceptability · Second-order BSDE · Stochastic control Mathematics Subject Classification (2000)

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“…Assume that T is a large enough number. For the logarithm utility case, the optimal consumption c * t = x * c,L (q L (t)), t ∈ [ 0, T ], is a deterministic process, with x * c,L (·) and q L (·) given respectively in (29) and (34). Moreover, the optimal consumption c * t is summarized in Table 5 3 .…”

Section: The Optimal Consumption Under Logarithm Utilitymentioning

confidence: 99%

“…First, it is clear that the solution of ODE (19) takes the form (34). From (29), we know that x * c,L (x q ) is nonincreasing with respect to x q . Moreover, the expression (34) implies that q L (·) is nondecreasing with respect to t when ρ ≥ λ, and nonincreasing with respect to t when ρ ≤ λ.…”

Section: The Optimal Consumption Under Logarithm Utilitymentioning

confidence: 99%

Constrained portfolio-consumption strategies with uncertain parameters and borrowing costs

2018

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This paper studies the properties of the optimal portfolio-consumption strategies in a finite horizon robust utility maximization framework with different borrowing and lending rates. In particular, we allow for constraints on both investment and consumption strategies, and model uncertainty on both drift and volatility. With the help of explicit solutions, we quantify the impacts of uncertain market parameters, portfolio-consumption constraints and borrowing costs on the optimal strategies and their time monotone properties.

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Robust utility maximization for a diffusion market model with misspecified coefficients

Cited by 40 publications

References 39 publications

Robust utility maximisation in markets with transaction costs

Robust utility maximisation in markets with transaction costs

Good deal hedging and valuation under combined uncertainty about drift and volatility

Constrained portfolio-consumption strategies with uncertain parameters and borrowing costs

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