Abstract: In many situations where stochastic modeling is used, one desires to choose the coefficients of a stochastic differential equation which represents the reality as simply as possible. For example one desires to approximate a diffusion model
with high complexity coefficients by a model within a class of simple diffusion models. To achieve this goal, we introduce a new Wasserstein type distance on the set of laws of solutions to d-dimensional stochastic differential equations.
This new distance W˜2 is defined similarly to the classical Wasserstein distance W˜2 but the set of couplings is restricted to the set of laws of solutions of 2d-dimensional stochastic differential equations. We prove that this new distance W˜2 metrizes the weak topology. Furthermore this distance W˜2 is characterized in terms of a stochastic control problem. In the case d = 1 we can construct an explicit solution. The multi-dimensional case, is more tricky and classical results do not apply to solve the HJB equation because of the degeneracy of the differential operator. Nevertheless, we prove that this HJB equation admits a regular solution.
Recording during the meeting "Innovative Research in Mathematical Finance" the September 4, 2018 at the Centre International de Rencontres Mathématiques (Marseille, France)
Filmmaker: Guillaume Hennenfent
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with high complexity coefficients by a model within a class of simple diffusion models. To achieve this goal, we introduce a new Wasserstein type distance on the set of laws of solutions to d-dimensional stochastic differential equations.
This new distance W˜2 is defined similarly to the classical Wasserstein distance W˜2 but the set of couplings is restricted to the set of laws of solutions of 2d-dimensional stochastic differential equations. We prove that this new distance W˜2 metrizes the weak topology. Furthermore this distance W˜2 is characterized in terms of a stochastic control problem. In the case d = 1 we can construct an explicit solution. The multi-dimensional case, is more tricky and classical results do not apply to solve the HJB equation because of the degeneracy of the differential operator. Nevertheless, we prove that this HJB equation admits a regular solution.
Recording during the meeting "Innovative Research in Mathematical Finance" the September 4, 2018 at the Centre International de Rencontres Mathématiques (Marseille, France)
Filmmaker: Guillaume Hennenfent
Find this video and other talks given by worldwide mathematicians on CIRM's Audiovisual Mathematics Library: http://library.cirm-math.fr. And discover all its functionalities:
- Chapter markers and keywords to watch the parts of your choice in the video
- Videos enriched with abstracts, bibliographies, Mathematics Subject Classification
- Multi-criteria search by author, title, tags, mathematical area
Jocelyne Bion Nadal: Approximation and calibration of laws of solutions to stochastic... cnrs montpellier | |
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Science & Technology | Upload TimePublished on 19 Sep 2018 |
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