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Regularizing Portfolio Risk Analysis: A Bayesian Approach

Sourish Das (), Aritra Halder and Dipak K. Dey
Additional contact information
Sourish Das: Chennai Mathematical Institute
Aritra Halder: Chennai Mathematical Institute
Dipak K. Dey: University of Connecticut

Methodology and Computing in Applied Probability, 2017, vol. 19, issue 3, 865-889

Abstract: Abstract It is important for a portfolio manager to estimate and analyze portfolio volatility, to keep the portfolio’s risk within limit. Though the number of financial instruments in the portfolio can be very large, sometimes more than thousands, daily returns considered for analysis are only for a month or even less. In this case rank of portfolio covariance matrix is less than full, hence solution is not unique. It is typically known as the “ill-posed” problem. In this paper we discuss a Bayesian approach to regularize the problem. One of the additional advantages of this approach is to analyze the source of risk by estimating the probability of positive ‘conditional contribution to total risk’ (CCTR). Each source’s CCTR would sum up to the portfolio’s total volatility risk. Existing methods only estimate CCTR of a source, and does not estimate the probability of CCTR to be significantly greater (or less) than zero. This paper presents Bayesian methodology to do so. We propose a simple Monte Carlo (MC) approach to achieve our objective, which can be paralleled. Estimation of various risk measures, such as Value at Risk and Expected Shortfall, becomes a by-product of this Monte-Carlo approach.

Keywords: Monte Carlo algorithm; Parallel computation; Risk analysis; Shrinkage method; Volatility; 62F; 62P; 91G (search for similar items in EconPapers)
Date: 2017
References: View references in EconPapers View complete reference list from CitEc
Citations: View citations in EconPapers (2)

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DOI: 10.1007/s11009-016-9524-5

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