Conditional value-at-risk (CVaR) is the extended risk measure of value-at-risk that quantifies the average loss over a specified time period of unlikely scenarios beyond the confidence level. For example, a one-day 99% CVaR of $12 million means that the expected loss of the worst 1% scenarios over a one-day period is $12 million. Conditional value at risk is also known as expected shortfall.
Practitioners in both risk management and portfolio management are increasingly using conditional value-at-risk. For example:
- Conditional value-at-risk is replacing VaR for calculating market risk capital in the fundamental review of the treading book (FRTB) by Basel Committee on Banking Supervision (BCBS).
- CVaR is being adopted for portfolio optimization.
Depending on the asset classes and types of risk exposure, risk managers employ various mathematical techniques to calculate conditional value-at-risk, including:
- Monte Carlo simulation
- Copula-based portfolio simulation
- Pricing and valuation of financial derivatives
- Econometrics models (e.g., interest rate models and GARCH models)