This paper proposes two algorithms for solving stochastic control problems with deep learning, with a focus on the utility maximisation problem. The first algorithm solves Markovian problems via the Hamilton Jacobi Bellman (HJB) equation. We solve this highly nonlinear partial differential equation (PDE) with a second order backward stochastic differential equation (2BSDE) formulation. The convex structure of the problem allows us to describe a dual problem that can either verify the original primal approach or bypass some of the complexity. The second algorithm utilises the full power of the duality method to solve non-Markovian problems, which are often beyond the scope of stochastic control solvers in the existing literature. We solve an...
Optimal control of diffusion processes is intimately connected to the problem of solving certain Ham...
The optimal stopping problem is one of the core problems in financial markets, with broad applicatio...
We consider three problems motivated by mathematical and computational finance which utilize forward...
In this thesis numerical methods for stochastic optimal control are investigated. More precisely a n...
The objective of this Final Year Project is to study deep learning-based numerical methods, with a f...
In this paper, we propose a deep learning based numerical scheme for strongly coupled FBSDEs, stemmi...
Backward stochastic differential equations (BSDE) are known to be a powerful tool in mathematical mo...
Stochastic optimal control has seen significant recent development, motivated by its success in a pl...
The present thesis deals with numerical schemes to solve Markov Decision Problems (MDPs), partial di...
to appear in Machine Learning And Data Sciences For Financial Markets: A Guide To Contemporary Pract...
In this paper, we propose a deep learning based numerical scheme for strongly coupled forward backwa...
39 pages, 14 figuresInternational audienceThis paper presents several numerical applications of deep...
Thesis: Ph. D., Massachusetts Institute of Technology, Sloan School of Management, Operations Resear...
The present thesis deals with numerical schemes to solve Markov Decision Problems (MDPs), partial di...
In this paper, we give an overview of recently developed machine learning methods for stochastic con...
Optimal control of diffusion processes is intimately connected to the problem of solving certain Ham...
The optimal stopping problem is one of the core problems in financial markets, with broad applicatio...
We consider three problems motivated by mathematical and computational finance which utilize forward...
In this thesis numerical methods for stochastic optimal control are investigated. More precisely a n...
The objective of this Final Year Project is to study deep learning-based numerical methods, with a f...
In this paper, we propose a deep learning based numerical scheme for strongly coupled FBSDEs, stemmi...
Backward stochastic differential equations (BSDE) are known to be a powerful tool in mathematical mo...
Stochastic optimal control has seen significant recent development, motivated by its success in a pl...
The present thesis deals with numerical schemes to solve Markov Decision Problems (MDPs), partial di...
to appear in Machine Learning And Data Sciences For Financial Markets: A Guide To Contemporary Pract...
In this paper, we propose a deep learning based numerical scheme for strongly coupled forward backwa...
39 pages, 14 figuresInternational audienceThis paper presents several numerical applications of deep...
Thesis: Ph. D., Massachusetts Institute of Technology, Sloan School of Management, Operations Resear...
The present thesis deals with numerical schemes to solve Markov Decision Problems (MDPs), partial di...
In this paper, we give an overview of recently developed machine learning methods for stochastic con...
Optimal control of diffusion processes is intimately connected to the problem of solving certain Ham...
The optimal stopping problem is one of the core problems in financial markets, with broad applicatio...
We consider three problems motivated by mathematical and computational finance which utilize forward...