What does beta look like in the out-of-sample period for the portfolios generated to have beta equal to 1?
In the comments Ian Priest wonders if the results in “The effect of beta equal 1” are due to a shift in beta from the estimation period to the out-of-sample period. (The current post will make more sense if you read that one first.)
Creating the betas for the stocks for the first half of 2011 (the out-of-sample period) is easy enough — it is just another regression. Figure 1 compares the stock betas for the two periods.
The realized betas for the portfolios are a bit trickier. They depend on the weights of assets in the portfolios, and the weights change throughout the period as the prices change. Figures 2 and 3 show the portfolio realized betas using either the weights at the start of the period or the weights at the end of the period.
The surprise for me in these plots is how stable the portfolio betas are — that is, how close they remain to 1. Figure 6 of “4 and a half myths about beta in finance” indicates how variable stock betas can be.
As expected, using the weights at the mid-point tends to be a compromise between the weights at either end of the period.
Figures 4 and 5 show the portfolio returns versus the mid-point realized betas.
The first step is, of course, to estimate the betas for the new period:
spbeta2011H1 <- coef(lm(spcon2011H1 ~ spx2011H1))[2,]
The other step is to get the portfolio weights based on some set of prices and then multiply the weights by the corresponding betas and sum:
rbet1.spb1.20 <- unlist(lapply(valuation(ran.spb1.20, weight=TRUE, prices=spclose2011H1[1,]), function(x) sum(x * spbeta2011H1[names(x)])))
The valuation function in this case returns a list where each component is the weight vector of a random portfolio. A function to get the portfolio beta given the weights is then applied to each component of that list. Finally the resulting list of portfolio betas is simplified to a vector.