Efficient frontier
The efficient frontier contains all portfolios that maximise expected return for each level of total risk.
FrameworkModern portfolio theory
See it move
Plotting every feasible combination of risky assets against risk on the horizontal axis and expected return on the vertical axis produces a cloud of portfolios. The efficient frontier is the upper-left boundary of that cloud: at every risk level, no other feasible portfolio offers a higher return. Rational investors choose only from portfolios lying on this frontier.
The formula
Variables
- expected return on the portfolio
- portfolio weight of asset i (all weights sum to 1)
- expected return on asset i
Holds for any number of assets. Together with the variance formula, this maps every feasible portfolio; the efficient frontier is the upper boundary of that feasible set.
Variables
- portfolio variance
- portfolio weights of assets 1 and 2
- standard deviations of returns on assets 1 and 2
- correlation coefficient between assets 1 and 2 (ranges from −1 to +1)
When ρ₁₂ = 1 no variance reduction occurs; when ρ₁₂ = −1 a zero-variance combination is achievable. Tracing all (w₁, w₂) combinations generates the feasible set from which the efficient frontier is identified.
Check yourself
Investor Andrés holds a risky portfolio that lies strictly inside the feasible set of mean-variance portfolios but below the efficient frontier. Which statement best describes this portfolio?