Measuring and Analysing Marginal Systemic Risk Contribution using CoVaR: A Copula Approach

Abstract

This paper is devoted to the quantification and analysis of marginal risk contribution of a given single financial institution i to the risk of a financial system s. Our work expands on the CoVaR concept proposed by Adrian and Brunnermeier as a tool for the measurement of marginal systemic risk contribution. We first give a mathematical definition of CoVaRαs|Li=l. Our definition improves the CoVaR concept by expressing CoVaRαs|Li=l as a function of a state l and of a given probability level α relative to i and s respectively. Based on Copula theory we connect CoVaRαs|Li=l to the partial derivatives of Copula through their probabilistic interpretation and definitions (Conditional Probability). Using this we provide a closed formula for the calculation of CoVaRαs|Li=l for a large class of (marginal) distributions and dependence structures (linear and non-linear). Our formula allows a better analysis of systemic risk using CoVaR in the sense that it allows to define CoVaRαs|Li=l depending on the marginal distributions of the losses of i and s respectively and the copula between Li and Ls. We discuss the implications of this in the context of the quantification and analysis of systemic risk contributions. %some mathematical This makes possible the For example we will analyse the marginal effects of Li, Ls and C of the risk contribution of i.