We study the semilinear partial differential equation (PDE) associated with the non-linear BSDE characterizing buyer’s and seller’s XVA in a framework that allows for asymmetries in funding, repo and collateral rates, as well as for early contract termination due to counterparty credit risk. We show the existence of a unique classical solution to the PDE by first proving the existence and uniqueness of a viscosity solution and then its regularity. We use the uniqueness result to conduct a thorough numerical study illustrating how funding costs, repo rates, and counterparty credit risk contribute to determine the total valuation adjustment
Thesis (Ph.D.)--University of Washington, 2019We examine three problems in mathematical finance. The...
This paper proposes a general approximation method for the solutions to second-order parabolic parti...
This thesis studies advanced and accurate discretization schemes for relevant partial differential e...
We study conditions for existence, uniqueness and invariance of the comprehensive nonlinear valuatio...
We develop a framework for computing the total valuation adjustment (XVA) of a European claim accoun...
The purpose of this paper is to present numerical solutions to PDE representations for derivatives p...
We develop a consistent, arbitrage-free framework for valuing derivative trades with collateral, cou...
We explicitly solve some mixed initial/boundary value problems for gen- eralized Black-Scholes PDEs...
We consider a nonlinear pricing problem that takes into account credit risk and funding issues. The ...
This thesis examines two distinct classes of problem in which nonlinearities arise in option pricing...
In this work we will present a self-contained introduction to the option pricing problem. We will in...
Since the 2008 global financial crisis, the banking industry has been using valuation adjustments to...
In this work we will present a self-contained introduction to the option pricing problem. ...
The 2008 credit crisis changed the manner in which derivative trades are conducted. One of these cha...
We take the holistic approach of computing an OTC claim value that incorporates credit and funding l...
Thesis (Ph.D.)--University of Washington, 2019We examine three problems in mathematical finance. The...
This paper proposes a general approximation method for the solutions to second-order parabolic parti...
This thesis studies advanced and accurate discretization schemes for relevant partial differential e...
We study conditions for existence, uniqueness and invariance of the comprehensive nonlinear valuatio...
We develop a framework for computing the total valuation adjustment (XVA) of a European claim accoun...
The purpose of this paper is to present numerical solutions to PDE representations for derivatives p...
We develop a consistent, arbitrage-free framework for valuing derivative trades with collateral, cou...
We explicitly solve some mixed initial/boundary value problems for gen- eralized Black-Scholes PDEs...
We consider a nonlinear pricing problem that takes into account credit risk and funding issues. The ...
This thesis examines two distinct classes of problem in which nonlinearities arise in option pricing...
In this work we will present a self-contained introduction to the option pricing problem. We will in...
Since the 2008 global financial crisis, the banking industry has been using valuation adjustments to...
In this work we will present a self-contained introduction to the option pricing problem. ...
The 2008 credit crisis changed the manner in which derivative trades are conducted. One of these cha...
We take the holistic approach of computing an OTC claim value that incorporates credit and funding l...
Thesis (Ph.D.)--University of Washington, 2019We examine three problems in mathematical finance. The...
This paper proposes a general approximation method for the solutions to second-order parabolic parti...
This thesis studies advanced and accurate discretization schemes for relevant partial differential e...