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dc.contributor.authorArapostathis, Arien_US
dc.contributor.authorBISWAS, ANUPen_US
dc.contributor.authorCaffarelli, Luisen_US
dc.date.accessioned2019-08-26T06:52:59Z
dc.date.available2019-08-26T06:52:59Z
dc.date.issued2019-07en_US
dc.identifier.citationCommunications in Partial Differential Equations, 44(12), 1466-1480.en_US
dc.identifier.issn0360-5302en_US
dc.identifier.issn1532-4133en_US
dc.identifier.urihttp://dr.iiserpune.ac.in:8080/xmlui/handle/123456789/3809-
dc.identifier.urihttps://doi.org/10.1080/03605302.2019.1645697en_US
dc.description.abstractUniqueness of positive solutions to viscous Hamilton–Jacobi–Bellman (HJB) equations of the form −Δu(x)+1γ∣∣Du(x)∣∣γ=f(x)−λ, with f a coercive function and λ a constant, in the subquadratic case, that is, γ∈(1,2), appears to be an open problem. Barles and Meireles [Comm. Partial Differential Equations 41 (2016)] show uniqueness in the case that f(x)≈|x|β and |Df(x)|≲|x|(β−1)+ for some β>0, essentially matching earlier results of Ichihara, who considered more general Hamiltonians but with better regularity for f. Without enforcing this assumption, to our knowledge, there are no results on uniqueness in the literature. In this short article, we show that the equation has a unique positive solution for any locally Lipschitz continuous, coercive f which satisfies |Df(x)|≤κ(1+|f(x)|2−1/γ) for some positive constant κ. Since 2−1γ>1, this assumption imposes very mild restrictions on the growth of the potential f. We also show that this solution fully characterizes optimality for the associated ergodic problem. Our method involves the study of an infinite dimensional linear program for elliptic equations for measures, and is very different from earlier approaches. It also applies to the larger class of Hamiltonians studied by Ichihara, and we show that it is well suited to provide optimality results for the associated ergodic control problem, even in a pathwise sense, and without resorting to the parabolic problem.en_US
dc.language.isoenen_US
dc.publisherTaylor & Francisen_US
dc.subjectConvex dualityen_US
dc.subjectErgodic controlen_US
dc.subjectInfinitesimally invariant measuresen_US
dc.subjectViscous Hamilton-Jacobi equationsen_US
dc.subjectTOC-AUG-2019en_US
dc.subject2019en_US
dc.titleOn uniqueness of solutions to viscous HJB equations with a subquadratic nonlinearity in the gradienten_US
dc.typeArticleen_US
dc.contributor.departmentDept. of Mathematicsen_US
dc.identifier.sourcetitleCommunications in Partial Differential Equationsen_US
dc.publication.originofpublisherForeignen_US
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