Probability theory and related fields, 2018-10, Vol.172 (1-2), p.71-101
2018
Details
- Autor(en) / Beteiligte
- Titel
- Geometry of distribution-constrained optimal stopping problems
- Ist Teil von
- Probability theory and related fields, 2018-10, Vol.172 (1-2), p.71-101
- Ort / Verlag
- Berlin/Heidelberg: Springer Berlin Heidelberg
- Erscheinungsjahr
- 2018
- Link zum Volltext
- Quelle
- SpringerLink Journals
- Beschreibungen/Notizen
- We adapt ideas and concepts developed in optimal transport (and its martingale variant) to give a geometric description of optimal stopping times τ of Brownian motion subject to the constraint that the distribution of τ is a given probability μ . The methods work for a large class of cost processes. (At a minimum we need the cost process to be measurable and ( F t 0 ) t ≥ 0 -adapted. Continuity assumptions can be used to guarantee existence of solutions.) We find that for many of the cost processes one can come up with, the solution is given by the first hitting time of a barrier in a suitable phase space. As a by-product we recover classical solutions of the inverse first passage time problem/Shiryaev’s problem.
- Sprache
- Englisch
- Identifikatoren
- ISSN: 0178-8051eISSN: 1432-2064DOI: 10.1007/s00440-017-0805-xTitel-ID: cdi_pubmedcentral_primary_oai_pubmedcentral_nih_gov_6191205
- Format
- –
- Schlagworte
- Brownian motion, Economics, Finance, Insurance, Management, Martingales, Mathematical and Computational Biology, Mathematical and Computational Physics, Mathematics, Mathematics and Statistics, Operations Research/Decision Theory, Probabilistic methods, Probability, Probability Theory and Stochastic Processes, Quantitative Finance, Random walk theory, Statistics for Business, Theoretical