Upside beta

In investing, upside beta is the element of traditional beta that investors do not typically associate with the true meaning of risk.^[1] It is defined to be the scaled amount by which an asset tends to move compared to a benchmark, calculated only on days when the benchmark's return is positive.

Formula

Upside beta measures this upside risk. Defining $r_{i}$ and $r_{m}$ as the excess returns to security $i$ and market $m$ , $u_{m}$ as the average market excess return, and Cov and Var as the covariance and variance operators, the CAPM can be modified to incorporate upside (or downside) beta as follows.^[2]

\beta ^{+}={\frac {\operatorname {Cov} (r_{i},r_{m}\mid r_{m}>u_{m})}{\operatorname {Var} (r_{m}\mid r_{m}>u_{m})}},

with downside beta $\beta ^{-}$ defined with the inequality directions reversed. Therefore, $\beta ^{-}$ and $\beta ^{+}$ can be estimated with a regression of excess return of security $i$ on excess return of the market, conditional on excess market return being below the mean (downside beta) and above the mean (upside beta)."^[3] Upside beta is calculated using asset returns only on those days when the benchmark returns are positive. Upside beta and downside beta are also differentiated in the dual-beta model.

References

^ James Chong; Yanbo Jin; G. Michael Phillips (April 29, 2013). "The Entrepreneur's Cost of Capital: Incorporating Downside Risk in the Buildup Method" (PDF). p. 2. Retrieved 26 June 2013.
^ Bawa, V.; Lindenberg, E. (1977). "Capital market equilibrium in a mean-lower partial moment framework". Journal of Financial Economics. 5 (2): 189–200. doi:10.1016/0304-405x(77)90017-4.
^ Bawa, V.; Lindenberg, E. (1977). "Capital market equilibrium in a mean-lower partial moment framework". Journal of Financial Economics. 5 (2): 189–200. doi:10.1016/0304-405x(77)90017-4.