Rolling Sharpe Ratios

Similar to my rolling cumulative returns from last post, in this post, I will present a way to compute and plot rolling Sharpe ratios. Also, I edited the code to compute rolling returns to be more general with an option to annualize the returns, which is necessary for computing Sharpe ratios.

In any case, let’s look at some more code. First off, the new running cumulative returns:

"runCumRets" <- function(R, n = 252, annualized = FALSE, scale = NA) {
  R <- na.omit(R)
  if (is.na(scale)) {
    freq = periodicity(R)
    switch(freq$scale, minute = {
      stop("Data periodicity too high")
    }, hourly = {
      stop("Data periodicity too high")
    }, daily = {
      scale = 252
    }, weekly = {
      scale = 52
    }, monthly = {
      scale = 12
    }, quarterly = {
      scale = 4
    }, yearly = {
      scale = 1
    })
  }
  cumRets <- cumprod(1+R)
  if(annualized) {
    rollingCumRets <- (cumRets/lag(cumRets, k = n))^(scale/n) - 1 
  } else {
    rollingCumRets <- cumRets/lag(cumRets, k = n) - 1
  }
  return(rollingCumRets)
}

Essentially, a more general variant, with an option to annualize returns over longer (or shorter) periods of time. This is necessary for the following running Sharpe ratio code:

"runSharpe" <- function(R, n = 252, scale = NA, volFactor = 1) {
  if (is.na(scale)) {
    freq = periodicity(R)
    switch(freq$scale, minute = {
      stop("Data periodicity too high")
    }, hourly = {
      stop("Data periodicity too high")
    }, daily = {
      scale = 252
    }, weekly = {
      scale = 52
    }, monthly = {
      scale = 12
    }, quarterly = {
      scale = 4
    }, yearly = {
      scale = 1
    })
  }
  rollingAnnRets <- runCumRets(R, n = n, annualized = TRUE)
  rollingAnnSD <- sapply(R, runSD, n = n)*sqrt(scale)
  rollingSharpe <- rollingAnnRets/rollingAnnSD ^ volFactor
  return(rollingSharpe)
}

The one little innovation I added is the vol factor parameter, allowing users to place more or less emphasis on the volatility. While changing it from 1 will make the calculation different from the standard Sharpe ratio, I added this functionality due to the Logical Invest strategy I did in the past, and thought that I might as well have this function run double duty.

And of course, this comes with a plotting function.

"plotRunSharpe" <- function(R, n = 252, ...) {
  sharpes <- runSharpe(R = R, n = n)
  sharpes <- sharpes[!is.na(sharpes[,1]),]
  chart.TimeSeries(sharpes, legend.loc="topleft", main=paste("Rolling", n, "period Sharpe Ratio"),
                   date.format="%Y", yaxis=FALSE, ylab="Sharpe Ratio", auto.grid=FALSE, ...)
  meltedSharpes <- do.call(c, data.frame(sharpes))
  axisLabels <- pretty(meltedSharpes, n = 10)
  axisLabels <- unique(round(axisLabels, 1))
  axisLabels <- axisLabels[axisLabels > min(axisLabels) & axisLabels < max(axisLabels)]
  axis(side=2, at=axisLabels, label=axisLabels, las=1)
}

So what does this look like, in the case of a 252-day FAA vs. SPY test?

Like this:

par(mfrow = c (2,1))
plotRunSharpe(comparison, n=252)
plotRunSharpe(comparison, n=756)

Essentially, similar to what we saw last time–only having poor performance at the height of the crisis and for a much smaller amount of time than SPY, and always possessing a three-year solid performance. One thing to note about the Sharpe ratio is that the interpretation in the presence of negative returns doesn’t make too much sense. That is, when returns are negative, having a small variance actually works against the Sharpe ratio, so a strategy that may have lost only 10% while SPY lost 50% might look every bit as bad on the Sharpe Ratio plots due to the nature of a small standard deviation punishing smaller negative returns as much as it benefits smaller positive returns.

In conclusion, this is a fast way of computing and plotting a running Sharpe ratio, and this function doubles up as a utility for use with strategies such as the Universal Investment Strategy from Logical Invest.

Thanks for reading.

NOTE: I am a freelance consultant in quantitative analysis on topics related to this blog. If you have contract or full time roles available for proprietary research that could benefit from my skills, please contact me through my LinkedIn here.

Introduction to my New IKReporting Package

This post will introduce my up and coming IKReporting package, and functions that compute and plot rolling returns, which are useful to compare recent performance, since simply looking at two complete equity curves may induce sample bias (EG SPY in 2008), which may not reflect the state of the markets going forward.

In any case, the motivation for this package was brought about by one of my readers, who has reminded me in the past of the demand for the in-the-ditches work of pretty performance reports. This package aims to make creating such thing as painless as possible, and I will be updating it rapidly in the near future.

The strategy in use for this post will be Flexible Asset Allocation from my IKTrading package, in order to celebrate the R/Finance lightning talk I’m approved for on FAA, and it’ll be compared to SPY.

Here’s the code:

require(IKTrading)
require(quantmod)
require(PerformanceAnalytics)

options("getSymbols.warning4.0"=FALSE)

symbols <- c("XLB", #SPDR Materials sector
             "XLE", #SPDR Energy sector
             "XLF", #SPDR Financial sector
             "XLP", #SPDR Consumer staples sector
             "XLI", #SPDR Industrial sector
             "XLU", #SPDR Utilities sector
             "XLV", #SPDR Healthcare sector
             "XLK", #SPDR Tech sector
             "XLY", #SPDR Consumer discretionary sector
             "RWR", #SPDR Dow Jones REIT ETF

             "EWJ", #iShares Japan
             "EWG", #iShares Germany
             "EWU", #iShares UK
             "EWC", #iShares Canada
             "EWY", #iShares South Korea
             "EWA", #iShares Australia
             "EWH", #iShares Hong Kong
             "EWS", #iShares Singapore
             "IYZ", #iShares U.S. Telecom
             "EZU", #iShares MSCI EMU ETF
             "IYR", #iShares U.S. Real Estate
             "EWT", #iShares Taiwan
             "EWZ", #iShares Brazil
             "EFA", #iShares EAFE
             "IGE", #iShares North American Natural Resources
             "EPP", #iShares Pacific Ex Japan
             "LQD", #iShares Investment Grade Corporate Bonds
             "SHY", #iShares 1-3 year TBonds
             "IEF", #iShares 3-7 year TBonds
             "TLT" #iShares 20+ year Bonds
)

from="2003-01-01"

#SPDR ETFs first, iShares ETFs afterwards
if(!"XLB" %in% ls()) {
  suppressMessages(getSymbols(symbols, from="2003-01-01", src="yahoo", adjust=TRUE))
}

prices <- list()
for(i in 1:length(symbols)) {
  prices[[i]] <- Cl(get(symbols[i]))
}
prices <- do.call(cbind, prices)
colnames(prices) <- gsub("\\.[A-z]*", "", colnames(prices))

faa <- FAA(prices = prices, riskFreeName = "SHY", bestN = 6, stepCorRank = TRUE)

getSymbols("SPY", from="1990-01-01")

comparison <- merge(faa, Return.calculate(Cl(SPY)), join='inner')
colnames(comparison) <- c("FAA", "SPY")

And now here’s where the new code comes in:

This is a simple function for computing running cumulative returns of a fixed window. It’s a quick three-liner function that can compute the cumulative returns over any fixed period near-instantaneously.

"runCumRets" <- function(R, n = 252) {
  cumRets <- cumprod(1+R)
  rollingCumRets <- cumRets/lag(cumRets, k = n) - 1
  return(rollingCumRets)
}

So how does this get interesting? Well, with some plotting, of course.

Here’s a function to create a plot of these rolling returns.

"plotCumRets" <- function(R, n = 252, ...) {
  cumRets <- runCumRets(R = R, n = n)
  cumRets <- cumRets[!is.na(cumRets[,1]),]
  chart.TimeSeries(cumRets, legend.loc="topleft", main=paste(n, "day rolling cumulative return"),
                   date.format="%Y", yaxis=FALSE, ylab="Return", auto.grid=FALSE)
  
  meltedCumRets <- do.call(c, data.frame(cumRets))
  axisLabels <- pretty(meltedCumRets, n = 10)
  axisLabels <- round(axisLabels, 1)
  axisLabels <- axisLabels[axisLabels > min(axisLabels) & axisLabels < max(axisLabels)]
  axis(side=2, at=axisLabels, label=paste(axisLabels*100, "%"), las=1)
}

While the computation is done in the first line, the rest of the code is simply to make a prettier plot.

Here’s what the 252-day rolling return comparison looks like.

require(IKReporting)
plotCumRets(comparison)

So here’s the interpretation: assuming that there isn’t too much return degradation in the implementation of the FAA strategy, it essentially delivers most of the upside of SPY while doing a much better job protecting the investor when things hit the fan. Recently, however, seeing as to how the stock market has been on a roar, there’s a slight bit of underperformance over the past several years.

However, let’s look at a longer time horizon — the cumulative return over 756 days.

plotCumRets(comparison, n = 756)

With the following result:

This offers a much clearer picture–essentially, what this states is that over any 756-day period, the strategy has not lost money, ever, unlike SPY, which would have wiped out three years of gains (and then some) at the height of the crisis. More recently, as the stock market is in yet another run-up, there has been some short-term (well, if 756 days can be called short-term) underperformance, namely due to SPY having some historical upward mobility.

On another unrelated topic, some of you (perhaps from Seeking Alpha) may have seen the following image floating around:

This is a strategy I have collaborated with Harry Long from Seeking Alpha on. While I’m under NDA and am not allowed to discuss the exact rules of this particular strategy, I can act as a liaison for those that wish to become a client of ZOMMA, LLC. While the price point is out of the reach of ordinary retail investors (the price point is into the six figures), institutions that are considering licensing one of these indices can begin by sending me an email at ilya.kipnis@gmail.com. I can also set up a phone call.

Thanks for reading.

NOTE: I am a freelance consultant in quantitative analysis on topics related to this blog. If you have contract or full time roles available for proprietary research that could benefit from my skills, please contact me through my LinkedIn here.

The Downside of Rankings-Based Strategies

This post will demonstrate a downside to rankings-based strategies, particularly when using data of a questionable quality (which, unless one pays multiple thousands of dollars per month for data, most likely is of questionable quality). Essentially, by making one small change to the way the strategy filters, it introduces a massive performance drop in terms of drawdown. This exercise effectively demonstrates a different possible way of throwing a curve-ball at ranking strategies to test for robustness.

Recently, a discussion came up between myself, Terry Doherty, Cliff Smith, and some others on Seeking Alpha regarding what happened when I substituted the 63-day SMA for the three month SMA in Cliff Smith’s QTS strategy (quarterly tactical strategy…strategy).

Essentially, by simply substituting a 63-day SMA (that is, using daily data instead of monthly) for a 3-month SMA, the results were drastically affected.

Here’s the new QTS code, now in a function.

qts <- function(prices, nShort = 20, nLong = 105, nMonthSMA = 3, nDaySMA = 63, wRankShort=1, wRankLong=1.01, 
                movAvgType = c("monthly", "daily"), cashAsset="VUSTX", returnNames = FALSE) {
  cashCol <- grep(cashAsset, colnames(prices))
  
  #start our data off on the security with the least data (VGSIX in this case)
  prices <- prices[!is.na(prices[,7]),] 
  
  #cash is not a formal asset in our ranking
  cashPrices <- prices[, cashCol]
  prices <- prices[, -cashCol]
  
  #compute momentums
  rocShort <- prices/lag(prices, nShort) - 1
  rocLong <- prices/lag(prices, nLong) - 1
  
  #take the endpoints of quarter start/end
  quarterlyEps <- endpoints(prices, on="quarters")
  monthlyEps <- endpoints(prices, on = "months")
  
  #take the prices at quarterly endpoints
  quarterlyPrices <- prices[quarterlyEps,]
  
  #short momentum at quarterly endpoints (20 day)
  rocShortQtrs <- rocShort[quarterlyEps,]
  
  #long momentum at quarterly endpoints (105 day)
  rocLongQtrs <- rocLong[quarterlyEps,]
  
  #rank short momentum, best highest rank
  rocSrank <- t(apply(rocShortQtrs, 1, rank))
  
  #rank long momentum, best highest rank
  rocLrank <- t(apply(rocLongQtrs, 1, rank))
  
  #total rank, long slightly higher than short, sum them
  totalRank <- wRankLong * rocLrank + wRankShort * rocSrank 
  
  #function that takes 100% position in highest ranked security
  maxRank <- function(rankRow) {
    return(rankRow==max(rankRow))
  }
  
  #apply above function to our quarterly ranks every quarter
  rankPos <- t(apply(totalRank, 1, maxRank))
  
  #SMA of securities, only use monthly endpoints
  #subset to quarters
  #then filter
  movAvgType = movAvgType[1]
  if(movAvgType=="monthly") {
    monthlyPrices <- prices[monthlyEps,]
    monthlySMAs <- xts(apply(monthlyPrices, 2, SMA, n=nMonthSMA), order.by=index(monthlyPrices))
    quarterlySMAs <- monthlySMAs[index(quarterlyPrices),]
    smaFilter <- quarterlyPrices > quarterlySMAs
  } else if (movAvgType=="daily") {
    smas <- xts(apply(prices, 2, SMA, n=nDaySMA), order.by=index(prices))
    quarterlySMAs <- smas[index(quarterlyPrices),]
    smaFilter <- quarterlyPrices > quarterlySMAs
  } else {
    stop("invalid moving average type")
  }
  
  finalPos <- rankPos*smaFilter
  finalPos <- finalPos[!is.na(rocLongQtrs[,1]),]
  cash <- xts(1-rowSums(finalPos), order.by=index(finalPos))
  finalPos <- merge(finalPos, cash, join='inner')
  
  prices <- merge(prices, cashPrices, join='inner')
  returns <- Return.calculate(prices)
  stratRets <- Return.portfolio(returns, finalPos)
  
  if(returnNames) {
    findNames <- function(pos) {
      return(names(pos[pos==1]))
    }
    tmp <- apply(finalPos, 1, findNames)
    assetNames <- xts(tmp, order.by=as.Date(names(tmp)))
    return(list(assetNames, stratRets))
  }
  return(stratRets)
}

The one change I made is this:

  movAvgType = movAvgType[1]
  if(movAvgType=="monthly") {
    monthlyPrices <- prices[monthlyEps,]
    monthlySMAs <- xts(apply(monthlyPrices, 2, SMA, n=nMonthSMA), order.by=index(monthlyPrices))
    quarterlySMAs <- monthlySMAs[index(quarterlyPrices),]
    smaFilter <- quarterlyPrices > quarterlySMAs
  } else if (movAvgType=="daily") {
    smas <- xts(apply(prices, 2, SMA, n=nDaySMA), order.by=index(prices))
    quarterlySMAs <- smas[index(quarterlyPrices),]
    smaFilter <- quarterlyPrices > quarterlySMAs
  } else {
    stop("invalid moving average type")
  }

In essence, it allows the function to use either a monthly-calculated moving average, or a daily, which is then subset to the quarterly frequency of the rest of the data.

(I also allow the function to return the names of the selected securities.)

So now we can do two tests:

1) The initial parameter settings (20-day short-term momentum, 105-day long-term momentum, equal weigh their ranks (tiebreaker to the long-term), and use a 3-month SMA to filter)
2) The same exact parameter settings, except a 63-day SMA for the filter.

Here’s the code to do that.

#get our data from yahoo, use adjusted prices
symbols <- c("NAESX", #small cap
             "PREMX", #emerging bond
             "VEIEX", #emerging markets
             "VFICX", #intermediate investment grade
             "VFIIX", #GNMA mortgage
             "VFINX", #S&P 500 index
             "VGSIX", #MSCI REIT
             "VGTSX", #total intl stock idx
             "VUSTX") #long term treasury (cash)

getSymbols(symbols, from="1990-01-01")
prices <- list()
for(i in 1:length(symbols)) {
  prices[[i]] <- Ad(get(symbols[i]))  
}
prices <- do.call(cbind, prices)
colnames(prices) <- gsub("\\.[A-z]*", "", colnames(prices))

monthlySMAqts <- qts(prices, returnNames=TRUE)
dailySMAqts <- qts(prices, wRankShort=.95, wRankLong=1.05, movAvgType = "daily", returnNames=TRUE)

retsComparison <- cbind(monthlySMAqts[[2]], dailySMAqts[[2]])
colnames(retsComparison) <- c("monthly SMA qts", "daily SMA qts")
retsComparison <- retsComparison["2003::"]
charts.PerformanceSummary(retsComparison["2003::"])
rbind(table.AnnualizedReturns(retsComparison["2003::"]), maxDrawdown(retsComparison["2003::"]))

And here are the results:

Statistics:

                          monthly SMA qts daily SMA qts
Annualized Return               0.2745000     0.2114000
Annualized Std Dev              0.1725000     0.1914000
Annualized Sharpe (Rf=0%)       1.5915000     1.1043000
Worst Drawdown                  0.1911616     0.3328411

With the corresponding equity curves:

Here are the several instances in which the selections do not match thanks to the filters:

selectedNames <- cbind(monthlySMAqts[[1]], dailySMAqts[[1]])
colnames(selectedNames) <- c("Monthly SMA Filter", "Daily SMA Filter")
differentSelections <- selectedNames[selectedNames[,1]!=selectedNames[,2],]

With the results:

           Monthly SMA Filter Daily SMA Filter
1997-03-31 "VGSIX"            "cash"          
2007-12-31 "cash"             "PREMX"         
2008-06-30 "cash"             "VFIIX"         
2008-12-31 "cash"             "NAESX"         
2011-06-30 "cash"             "NAESX"  

Now, of course, many can make the arguments that Yahoo’s data is junk, my backtest doesn’t reflect reality, etc., which would essentially miss the point: this data here, while not a perfect realization of the reality of Planet Earth, may as well have been valid (you know, like all the academics, who use various simulation techniques to synthesize more data or explore other scenarios?). All I did here was change the filter to something logically comparable (that is, computing the moving average filter on a different time-scale, which does not in any way change the investment logic). From 2003 onward, this change only affected the strategy in four places. However, those instances were enough to create some noticeable changes (for the worse) in the strategy’s performance. Essentially, the downside of rankings-based strategies are when the overall number of selected instruments (in this case, ONE!) is small, a few small changes in parameters, data, etc. can lead to drastically different results.

As I write this, Cliff Smith already has ideas as to how to counteract this phenomenon. However, unto my experience, once a strategy starts getting into “how do we smooth out that one bump on the equity curve” territory, I think it’s time to go back and re-examine the strategy altogether. In my opinion, while the idea of momentum is of course, sound, with a great deal of literature devoted to it, the idea of selecting just one instrument at a time as the be-all-end-all strategy does not sit well with me. However, to me, QTS nevertheless presents an interesting framework for analyzing small subgroups of securities, and using it as one layer of an overarching strategy framework, such that the return streams are sub-strategies, instead of raw instruments.

Thanks for reading.

NOTE: I am a freelance consultant in quantitative analysis on topics related to this blog. If you have contract or full time roles available for proprietary research that could benefit from my skills, please contact me through my LinkedIn here.

The Logical-Invest “Universal Investment Strategy”–A Walk Forward Process on SPY and TLT

I’m sure we’ve all heard about diversified stock and bond portfolios. In its simplest, most diluted form, it can be comprised of the SPY and TLT etfs. The concept introduced by Logical Invest, in a Seeking Alpha article written by Frank Grossman (also see link here), essentially uses a walk-forward methodology of maximizing a modified Sharpe ratio, biased heavily in favor of the volatility rather than the returns. That is, it uses a 72-day moving window to maximize total returns between different weighting configurations of a SPY-TLT mix over the standard deviation raised to the power of 5/2. To put it into perspective, at a power of 1, this is the basic Sharpe ratio, and at a power of 0, just a momentum maximization algorithm.

The process for this strategy is simple: rebalance every month on some multiple of 5% between SPY and TLT that previously maximized the following quantity (returns/vol^2.5 on a 72-day window).

Here’s the code for obtaining the data and computing the necessary quantities:

require(quantmod)
require(PerformanceAnalytics)
getSymbols(c("SPY", "TLT"), from="1990-01-01")
returns <- merge(Return.calculate(Ad(SPY)), Return.calculate(Ad(TLT)), join='inner')
returns <- returns[-1,]
configs <- list()
for(i in 1:21) {
  weightSPY <- (i-1)*.05
  weightTLT <- 1-weightSPY
  config <- Return.portfolio(R = returns, weights=c(weightSPY, weightTLT), rebalance_on = "months")
  configs[[i]] <- config
}
configs <- do.call(cbind, configs)
cumRets <- cumprod(1+configs)
period <- 72

roll72CumAnn <- (cumRets/lag(cumRets, period))^(252/period) - 1
roll72SD <- sapply(X = configs, runSD, n=period)*sqrt(252)

Next, the code for creating the weights:

sd_f_factor <- 2.5
modSharpe <- roll72CumAnn/roll72SD^sd_f_factor
monthlyModSharpe <- modSharpe[endpoints(modSharpe, on="months"),]

findMax <- function(data) {
  return(data==max(data))
}

weights <- t(apply(monthlyModSharpe, 1, findMax))
weights <- weights*1
weights <- xts(weights, order.by=as.Date(rownames(weights)))
weights[is.na(weights)] <- 0
weights$zeroes <- 1-rowSums(weights)
configs$zeroes <- 0

That is, simply take the setting that maximizes the monthly modified Sharpe Ratio calculation at each rebalancing date (the end of every month).

Next, here’s the performance:

stratRets <- Return.portfolio(R = configs, weights = weights)
rbind(table.AnnualizedReturns(stratRets), maxDrawdown(stratRets))
charts.PerformanceSummary(stratRets)

Which gives the results:

> rbind(table.AnnualizedReturns(stratRets), maxDrawdown(stratRets))
                          portfolio.returns
Annualized Return                 0.1317000
Annualized Std Dev                0.0990000
Annualized Sharpe (Rf=0%)         1.3297000
Worst Drawdown                    0.1683851

With the following equity curve:

Not perfect, but how does it compare to the ingredients?

Let’s take a look:

stratAndComponents <- merge(returns, stratRets, join='inner')
charts.PerformanceSummary(stratAndComponents)
rbind(table.AnnualizedReturns(stratAndComponents), maxDrawdown(stratAndComponents))
apply.yearly(stratAndComponents, Return.cumulative)

Here are the usual statistics:

> rbind(table.AnnualizedReturns(stratAndComponents), maxDrawdown(stratAndComponents))
                          SPY.Adjusted TLT.Adjusted portfolio.returns
Annualized Return            0.0907000    0.0783000         0.1317000
Annualized Std Dev           0.1981000    0.1381000         0.0990000
Annualized Sharpe (Rf=0%)    0.4579000    0.5669000         1.3297000
Worst Drawdown               0.5518552    0.2659029         0.1683851

In short, it seems the strategy performs far better than either of the ingredients. Let’s see if the equity curve comparison reflects this.

Indeed, it does. While it does indeed have the drawdown in the crisis, both instruments were in drawdown at the time, so it appears that the strategy made the best of a bad situation.

Here are the annual returns:

> apply.yearly(stratAndComponents, Return.cumulative)
           SPY.Adjusted TLT.Adjusted portfolio.returns
2002-12-31  -0.02054891  0.110907611        0.01131366
2003-12-31   0.28179336  0.015936985        0.12566042
2004-12-31   0.10695067  0.087089794        0.09724221
2005-12-30   0.04830869  0.085918063        0.10525398
2006-12-29   0.15843880  0.007178861        0.05294557
2007-12-31   0.05145526  0.102972399        0.06230742
2008-12-31  -0.36794099  0.339612265        0.19590423
2009-12-31   0.26352114 -0.218105306        0.18826736
2010-12-31   0.15056113  0.090181150        0.16436950
2011-12-30   0.01890375  0.339915713        0.24562838
2012-12-31   0.15994578  0.024083393        0.06051237
2013-12-31   0.32303535 -0.133818884        0.13760060
2014-12-31   0.13463980  0.273123290        0.19637382
2015-02-20   0.02773183  0.006922893        0.02788726

2002 was an incomplete year. However, what’s interesting here is that on a whole, while the strategy rarely if ever does as well as the better of the two instruments, it always outperforms the worse of the two instruments–and not only that, but it has delivered a positive performance in every year of the backtest–even when one instrument or the other was taking serious blows to performance, such as SPY in 2008, and TLT in 2009 and 2013.

For the record, here is the weight of SPY in the strategy.

weightSPY <- apply(monthlyModSharpe, 1, which.max)
weightSPY <- do.call(rbind, weightSPY)
weightSPY <- (weightSPY-1)*.05
align <- cbind(weightSPY, stratRets)
align <- na.locf(align)
chart.TimeSeries(align[,1], date.format="%Y", ylab="Weight SPY", main="Weight of SPY in SPY-TLT pair")

Now while this may serve as a standalone strategy for some people, the takeaway in my opinion from this is that dynamically re-weighting two return streams that share a negative correlation can lead to some very strong results compared to the ingredients from which they were formed. Furthermore, rather than simply rely on one number to summarize a relationship between two instruments, the approach that Frank Grossman took to actually model the combined returns was one I find interesting, and undoubtedly has applications as a general walk-forward process.

Thanks for reading.

NOTE: I am a freelance consultant in quantitative analysis on topics related to this blog. If you have contract or full time roles available for proprietary research that could benefit from my skills, please contact me through my LinkedIn here.

A Closer Update To David Varadi’s Percentile Channels Strategy

So thanks to seeing Michael Kapler’s implementation of David Varadi’s percentile channels strategy, I was able to get a better understanding of what was going on. It turns out that rather than looking at the channel value only at the ends of months, that the strategy actually keeps track of the channel’s value intra-month. So if in the middle of the month, you had a sell signal and at the end of the month, the price moved up to intra-channel values, you would still be on a sell signal rather than the previous month’s end-of-month signal. It’s not much different than my previous implementation when all is said and done (slightly higher Sharpe, slightly lower returns and drawdowns). In any case, the concept remains the same.

For this implementation, I’m going to use the runquantile function from the caTools package, which contains a function called runquantile that works like a generalized runMedian/runMin/runMax from TTR, once you’re able to give it the proper arguments (on default, its results are questionable).

Here’s the code:

require(quantmod)
require(caTools)
require(PerformanceAnalytics)
require(TTR)
getSymbols(c("LQD", "DBC", "VTI", "ICF", "SHY"), from="1990-01-01")

prices <- cbind(Ad(LQD), Ad(DBC), Ad(VTI), Ad(ICF), Ad(SHY))
prices <- prices[!is.na(prices[,2]),]
returns <- Return.calculate(prices)
cashPrices <- prices[, 5]
assetPrices <- prices[, -5]

require(caTools)
pctChannelPosition <- function(prices,
                               dayLookback = 60, 
                               lowerPct = .25, upperPct = .75) {
  leadingNAs <- matrix(nrow=dayLookback-1, ncol=ncol(prices), NA)
  
  upperChannels <- runquantile(prices, k=dayLookback, probs=upperPct, endrule="trim")
  upperQ <- xts(rbind(leadingNAs, upperChannels), order.by=index(prices))
  
  lowerChannels <- runquantile(prices, k=dayLookback, probs=lowerPct, endrule="trim")
  lowerQ <- xts(rbind(leadingNAs, lowerChannels), order.by=index(prices))
  
  positions <- xts(matrix(nrow=nrow(prices), ncol=ncol(prices), NA), order.by=index(prices))
  positions[prices > upperQ & lag(prices) < upperQ] <- 1 #cross up
  positions[prices < lowerQ & lag(prices) > lowerQ] <- -1 #cross down
  positions <- na.locf(positions)
  positions[is.na(positions)] <- 0
  
  colnames(positions) <- colnames(prices)
  return(positions)
}

#find our positions, add them up
d60 <- pctChannelPosition(assetPrices)
d120 <- pctChannelPosition(assetPrices, dayLookback = 120)
d180 <- pctChannelPosition(assetPrices, dayLookback = 180)
d252 <- pctChannelPosition(assetPrices, dayLookback = 252)
compositePosition <- (d60 + d120 + d180 + d252)/4

compositeMonths <- compositePosition[endpoints(compositePosition, on="months"),]

returns <- Return.calculate(prices)
monthlySD20 <- xts(sapply(returns[,-5], runSD, n=20), order.by=index(prices))[index(compositeMonths),]
weight <- compositeMonths*1/monthlySD20
weight <- abs(weight)/rowSums(abs(weight))
weight[compositeMonths < 0 | is.na(weight)] <- 0
weight$CASH <- 1-rowSums(weight)

#not actually equal weight--more like composite weight, going with 
#Michael Kapler's terminology here
ewWeight <- abs(compositeMonths)/rowSums(abs(compositeMonths))
ewWeight[compositeMonths < 0 | is.na(ewWeight)] <- 0
ewWeight$CASH <- 1-rowSums(ewWeight)

rpRets <- Return.portfolio(R = returns, weights = weight)
ewRets <- Return.portfolio(R = returns, weights = ewWeight)

Essentially, with runquantile, you need to give it the “trim” argument, and then manually append the leading NAs, and then manually turn it into an xts object, which is annoying. One would think that the author of this package would take care of these quality-of-life issues, but no. In any case, there are two strategies at play here–one being the percentile channel risk parity strategy, and the other what Michael Kapler calls “channel equal weight”, which actually *isn’t* an equal weight strategy, since the composite parameter values may take the values (-1, -.5, 0, .5, and 1–with a possibility for .75 or .25 early on when some of the lookback channels still say 0 instead of only 1 or -1), but simply, the weights without taking into account volatility at all, but I’m sticking with Michael Kapler’s terminology to be consistent. That said, I don’t personally use Michael Kapler’s SIT package due to the vast differences in syntax between it and the usual R code I’m used to. However, your mileage may vary.

In any case, here’s the updated performance:

both <- cbind(rpRets, ewRets)
colnames(both) <- c("RiskParity", "Equal Weight")
charts.PerformanceSummary(both)
rbind(table.AnnualizedReturns(both), maxDrawdown(both))
apply.yearly(both, Return.cumulative)

Which gives us the following output:

> rbind(table.AnnualizedReturns(both), maxDrawdown(both))
                          RiskParity Equal Weight
Annualized Return         0.09380000    0.1021000
Annualized Std Dev        0.06320000    0.0851000
Annualized Sharpe (Rf=0%) 1.48430000    1.1989000
Worst Drawdown            0.06894391    0.1150246

> apply.yearly(both, Return.cumulative)
           RiskParity Equal Weight
2006-12-29 0.08352255   0.07678321
2007-12-31 0.05412147   0.06475540
2008-12-31 0.10663085   0.12212063
2009-12-31 0.11920721   0.19093131
2010-12-31 0.13756460   0.14594317
2011-12-30 0.11744706   0.08707801
2012-12-31 0.07730896   0.06085295
2013-12-31 0.06733187   0.08174173
2014-12-31 0.06435030   0.07357458
2015-02-17 0.01428705   0.01568372

In short, the more naive weighting scheme delivers slightly higher returns but pays dearly for those marginal returns with downside risk.

Here are the equity curves:

So, there you have it. The results David Varadi obtained are legitimate. But nevertheless, I hope this demonstrates how easy it is for the small details to make material differences.

Thanks for reading.

NOTE: I am a freelance consultant in quantitative analysis on topics related to this blog. If you have contract or full time roles available for proprietary research that could benefit from my skills, please contact me through my LinkedIn here.

An Attempt At Replicating David Varadi’s Percentile Channels Strategy

This post will detail an attempt at replicating David Varadi’s percentile channels strategy. As I’m only able to obtain data back to mid 2006, the exact statistics will not be identical. However, of the performance I do have, it is similar (but not identical) to the corresponding performance presented by David Varadi.

First off, before beginning this post, I’d like to issue a small mea culpa regarding the last post. It turns out that Yahoo’s data, once it gets into single digit dollar prices, is of questionable accuracy, and thus, results from the late 90s on mutual funds with prices falling into those ranges are questionable, as a result. As I am an independent blogger, and also make it a policy of readers being able to replicate all of my analysis, I am constrained by free data sources, and sometimes, the questionable quality of that data may materially affect results. So, if it’s one of your strategies replicated on this blog, and you find contention with my results, I would be more than happy to work with the data used to generate the original results, corroborate the results, and be certain that any differences in results from using lower-quality, publicly-available data stem from that alone. Generally, I find it surprising that a company as large as Yahoo can have such gaping data quality issues in certain aspects, but I’m happy that I was able to replicate the general thrust of QTS very closely.

This replication of David Varadi’s strategy, however, is not one such case–mainly because the data for DBC does not extend back very far (it was in inception only in 2006, and the data used by David Varadi’s programmer was obtained from Bloomberg, which I have no access to), and furthermore, I’m not certain if my methods are absolutely identical. Nevertheless, the strategy in and of itself is solid.

The way the strategy works is like this (to my interpretation of David Varadi’s post and communication with his other programmer). Given four securities (LQD, DBC, VTI, ICF), and a cash security (SHY), do the following:

Find the running the n-day quantile of an upper and lower percentile. Anything above the upper percentile gets a score of 1, anything lower gets a score of -1. Leave the rest as NA (that is, anything between the bounds).

Subset these quantities on their monthly endpoints. Any value between channels (NA) takes the quantity of the last value. (In short, na.locf). Any initial NAs become zero.

Do this with a 60-day, 120-day, 180-day, and 252-day setting at 25th and 75th percentiles. Add these four tables up (their dimensions are the number of monthly endpoints by the number of securities) and divide by the number of parameter settings (in this case, 4 for 60, 120, 180, 252) to obtain a composite position.

Next, obtain a running 20-day standard deviation of the returns (not prices!), and subset it for the same indices as the composite positions. Take the inverse of these volatility scores, and multiply it by the composite positions to get an inverse volatility position. Take its absolute value (some positions may be negative, remember), and normalize. In the beginning, there may be some zero-across-all-assets positions, or other NAs due to lack of data (EG if a monthly endpoint occurs before enough data to compute a 20-day standard deviation, there will be a row of NAs), which will be dealt with. Keep all positions with a positive composite position (that is, scores of .5 or 1, discard all scores of zero or lower), and reinvest the remainder into the cash asset (SHY, in our case). Those are the final positions used to generate the returns.

This is how it looks like in code.

This is the code for obtaining the data (from Yahoo finance) and separating it into cash and non-cash data.

require(quantmod)
require(caTools)
require(PerformanceAnalytics)
require(TTR)
getSymbols(c("LQD", "DBC", "VTI", "ICF", "SHY"), from="1990-01-01")

prices <- cbind(Ad(LQD), Ad(DBC), Ad(VTI), Ad(ICF), Ad(SHY))
prices <- prices[!is.na(prices[,2]),]
returns <- Return.calculate(prices)
cashPrices <- prices[, 5]
assetPrices <- prices[, -5]

This is the function for computing the percentile channel positions for a given parameter setting. Unfortunately, it is not instantaneous due to R’s rollapply function paying a price in speed for generality. While the package caTools has a runquantile function, as of the time of this writing, I have found differences between its output and runMedian in TTR, so I’ll have to get in touch with the package’s author.

pctChannelPosition <- function(prices, rebal_on=c("months", "quarters"),
                             dayLookback = 60, 
                             lowerPct = .25, upperPct = .75) {
  
  upperQ <- rollapply(prices, width=dayLookback, quantile, probs=upperPct)
  lowerQ <- rollapply(prices, width=dayLookback, quantile, probs=lowerPct)
  positions <- xts(matrix(nrow=nrow(prices), ncol=ncol(prices), NA), order.by=index(prices))
  positions[prices > upperQ] <- 1
  positions[prices < lowerQ] <- -1
  
  ep <- endpoints(positions, on = rebal_on[1])
  positions <- positions[ep,]
  positions <- na.locf(positions)
  positions[is.na(positions)] <- 0 
  
  colnames(positions) <- colnames(prices)
  return(positions)
}

The way this function works is simple: computes a running quantile using rollapply, and then scores anything with price above its 75th percentile as 1, and anything below the 25th percentile as -1, in accordance with David Varadi’s post.

It then subsets these quantities on months (quarters is also possible–or for that matter, other values, but the spirit of the strategy seems to be months or quarters), and imputes any NAs with the last known observation, or zero, if it is an initial NA before any position is found. Something I have found over the course of writing this and the QTS strategy is that one need not bother implementing a looping mechanism to allocate positions monthly if there isn’t a correlation matrix based on daily data involved every month, and it makes the code more readable.

Next, we find our composite position.

#find our positions, add them up
d60 <- pctChannelPosition(assetPrices)
d120 <- pctChannelPosition(assetPrices, dayLookback = 120)
d180 <- pctChannelPosition(assetPrices, dayLookback = 180)
d252 <- pctChannelPosition(assetPrices, dayLookback = 252)
compositePosition <- (d60 + d120 + d180 + d252)/4

Next, find the running volatility for the assets, and subset them to the same time period (in this case months) as our composite position. In David Varadi’s example, the parameter is a 20-day lookback.

#find 20-day rolling standard deviations, subset them on identical indices
#to the percentile channel monthly positions
sd20 <- xts(sapply(returns[,-5], runSD, n=20), order.by=index(assetPrices))
monthlySDs <- sd20[index(compositePosition)]

Next, perform the following steps: find the inverse volatility of these quantities, multiply by the composite position score, take the absolute value, and keep any position for which the composite position is greater than zero (or technically speaking, has positive signage). Due to some initial NA rows due to a lack of data (either not enough days to compute a running volatility, or no positive positions yet), those will simply be imputed to zero. Reinvest the remainder in cash.

#compute inverse volatilities
inverseVols <- 1/monthlySDs

#multiply inverse volatilities by composite positions
invVolPos <- inverseVols*compositePosition

#take absolute values of inverse volatility multiplied by position
absInvVolPos <- abs(invVolPos)

#normalize the above quantities
normalizedAbsInvVols <- absInvVolPos/rowSums(absInvVolPos)

#keep only positions with positive composite positions (remove zeroes/negative)
nonCashPos <- normalizedAbsInvVols * sign(compositePosition > 0)
nonCashPos[is.na(nonCashPos)] <- 0 #no positions before we have enough data

#add cash position which is complement of non-cash position
finalPos <- nonCashPos
finalPos$cashPos <- 1-rowSums(finalPos)

And finally, the punchline, how does this strategy perform?

#compute returns
stratRets <- Return.portfolio(R = returns, weights = finalPos)
charts.PerformanceSummary(stratRets)
stats <- rbind(table.AnnualizedReturns(stratRets), maxDrawdown(stratRets))
rownames(stats)[4] <- "Worst Drawdown"
stats

Like this:

> stats
                          portfolio.returns
Annualized Return                0.10070000
Annualized Std Dev               0.06880000
Annualized Sharpe (Rf=0%)        1.46530000
Worst Drawdown                   0.07449537

With the following equity curve:

The statistics are visibly worse than David Varadi’s 10% vs. 11.1% CAGR, 6.9% annualized standard deviation vs. 5.72%, 7.45% max drawdown vs. 5.5%, and derived statistics (EG MAR). However, my data starts far later, and 1995-1996 seemed to be phenomenal for this strategy. Here are the cumulative returns for the data I have:

> apply.yearly(stratRets, Return.cumulative)
           portfolio.returns
2006-12-29        0.11155069
2007-12-31        0.07574266
2008-12-31        0.16921233
2009-12-31        0.14600008
2010-12-31        0.12996371
2011-12-30        0.06092018
2012-12-31        0.07306617
2013-12-31        0.06303612
2014-12-31        0.05967415
2015-02-13        0.01715446

I see a major discrepancy between my returns and David’s returns in 2011, but beyond that, the results seem to be somewhere close in the pattern of yearly returns. Whether my methodology is incorrect (I think I followed the procedure to the best of my understanding, but of course, if someone sees a mistake in my code, please let me know), or whether it’s the result of using Yahoo’s questionable quality data, I am uncertain.

However, in my opinion, that doesn’t take away from the validity of the strategy as a whole. With a mid-1 Sharpe ratio on a monthly rebalancing scale, and steady new equity highs, I feel that this is a result worth sharing–even if not directly corroborated (yet, hopefully).

One last note–some of the readers on David Varadi’s blog have cried foul due to their inability to come close to his results. Since I’ve come close, I feel that the results are valid, and since I’m using different data, my results are not identical. However, if anyone has questions about my process, feel free to leave questions and/or comments.

Thanks for reading.

NOTE: I am a freelance consultant in quantitative analysis on topics related to this blog. If you have contract or full time roles available for proprietary research that could benefit from my skills, please contact me through my LinkedIn here.

The Quarterly Tactical Strategy (aka QTS)

This post introduces the Quarterly Tactical Strategy, introduced by Cliff Smith on a Seeking Alpha article. It presents a variation on the typical dual-momentum strategy that only trades over once a quarter, yet delivers a seemingly solid risk/return profile. The article leaves off a protracted period of unimpressive performance at the turn of the millennium, however.

First off, due to the imprecision of the English language, I received some help from TrendXplorer in implementing this strategy. Those who are fans of Amibroker are highly encouraged to visit his blog.

In any case, this strategy is fairly simple:

Take a group of securities (in this case, 8 mutual funds), and do the following:

Rank a long momentum (105 days) and a short momentum (20 days), and invest in the security with the highest composite rank, with ties going to the long momentum (that is, .501*longRank + .499*shortRank, for instance). If the security with the highest composite rank is greater than its three month SMA, invest in that security, otherwise, hold cash.

There are two critical points that must be made here:

1) The three-month SMA is *not* a 63-day SMA. It is precisely a three-point SMA up to that point on the monthly endpoints of that security.
2) Unlike in flexible asset allocation or elastic asset allocation, the cash asset is not treated as a formal asset.

Let’s look at the code. Here’s the data–which are adjusted-data mutual fund data (although with a quarterly turnover, the frequent trading constraint of not trading out of the security is satisfied, though I’m not sure how dividends are treated–that is, whether a retail investor would actually realize these returns less a hopefully tiny transaction cost through their brokers–aka hopefully not too much more than $1 per transaction):

require(quantmod)
require(PerformanceAnalytics)
require(TTR)

#get our data from yahoo, use adjusted prices
symbols <- c("NAESX", #small cap
             "PREMX", #emerging bond
             "VEIEX", #emerging markets
             "VFICX", #intermediate investment grade
             "VFIIX", #GNMA mortgage
             "VFINX", #S&P 500 index
             "VGSIX", #MSCI REIT
             "VGTSX", #total intl stock idx
             "VUSTX") #long term treasury (cash)

getSymbols(symbols, from="1990-01-01")
prices <- list()
for(i in 1:length(symbols)) {
  prices[[i]] <- Ad(get(symbols[i]))  
}
prices <- do.call(cbind, prices)
colnames(prices) <- gsub("\\.[A-z]*", "", colnames(prices))

#define our cash asset and keep track of which column it is
cashAsset <- "VUSTX"
cashCol <- grep(cashAsset, colnames(prices))

#start our data off on the security with the least data (VGSIX in this case)
prices <- prices[!is.na(prices[,7]),] 

#cash is not a formal asset in our ranking
cashPrices <- prices[, cashCol]
prices <- prices[, -cashCol]

Nothing anybody hasn’t seen before up to this point. Get data, start it off at most recent inception mutual fund, separate the cash prices, moving along.

What follows is a rather rough implementation of QTS, not wrapped up in any sort of function that others can plug and play with (though I hope I made the code readable enough for others to tinker with).

Let’s define parameters and compute momentum.

#define our parameters
nShort <- 20
nLong <- 105
nMonthSMA <- 3

#compute momentums
rocShort <- prices/lag(prices, nShort) - 1
rocLong <- prices/lag(prices, nLong) - 1

Now comes some endpoints functionality (or, more colloquially, magic) that the xts library provides. It’s what allows people to get work done in R much faster than in other programming languages.

#take the endpoints of quarter start/end
quarterlyEps <- endpoints(prices, on="quarters")
monthlyEps <- endpoints(prices, on = "months")

#take the prices at quarterly endpoints
quarterlyPrices <- prices[quarterlyEps,]

#short momentum at quarterly endpoints (20 day)
rocShortQtrs <- rocShort[quarterlyEps,]

#long momentum at quarterly endpoints (105 day)
rocLongQtrs <- rocLong[quarterlyEps,]

In short, get the quarterly endpoints (and monthly, we need those for the monthly SMA which you’ll see shortly) and subset our momentum computations on those quarterly endpoints. Now let’s get the total rank for those subset-on-quarters momentum computations.

#rank short momentum, best highest rank
rocSrank <- t(apply(rocShortQtrs, 1, rank))

#rank long momentum, best highest rank
rocLrank <- t(apply(rocLongQtrs, 1, rank))

#total rank, long slightly higher than short, sum them
totalRank <- 1.01*rocLrank + rocSrank 

#function that takes 100% position in highest ranked security
maxRank <- function(rankRow) {
  return(rankRow==max(rankRow))
}

#apply above function to our quarterly ranks every quarter
rankPos <- t(apply(totalRank, 1, maxRank))

So as you can see, I rank the momentum computations by row, take a weighted sum (in slight favor of the long momentum), and then simply take the security with the highest rank at every period, giving me one 1 in every row and 0s otherwise.

Now let’s do the other end of what determines position, which is the SMA filter. In this case, we need monthly data points for our three-month SMA, and then subset it to quarters to be on the same timescale as the quarterly ranks.

#SMA of securities, only use monthly endpoints
#subset to quarters
#then filter
monthlyPrices <- prices[monthlyEps,]
monthlySMAs <- xts(apply(monthlyPrices, 2, SMA, n=nMonthSMA), order.by=index(monthlyPrices))
quarterlySMAs <- monthlySMAs[index(quarterlyPrices),]
smaFilter <- quarterlyPrices > quarterlySMAs

Now let’s put it together to get our final positions. Our cash position is simply one if we don’t have a single investment in the time period, zero else.

finalPos <- rankPos*smaFilter
finalPos <- finalPos[!is.na(rocLongQtrs[,1]),]
cash <- xts(1-rowSums(finalPos), order.by=index(finalPos))
finalPos <- merge(finalPos, cash, join='inner')

Now we can finally compute our strategy returns.

prices <- merge(prices, cashPrices, join='inner')
returns <- Return.calculate(prices)
stratRets <- Return.portfolio(returns, finalPos)
table.AnnualizedReturns(stratRets)
maxDrawdown(stratRets)
charts.PerformanceSummary(stratRets)
plot(log(cumprod(1+stratRets)))

So what do things look like?

Like this:

> table.AnnualizedReturns(stratRets)
                          portfolio.returns
Annualized Return                    0.1899
Annualized Std Dev                   0.1619
Annualized Sharpe (Rf=0%)            1.1730
> maxDrawdown(stratRets)
[1] 0.1927991

And since the first equity curve doesn’t give much of an indication in the early years, I’ll take Tony Cooper’s (of Double Digit Numerics) advice and show the log equity curve as well.

In short, from 1997 through 2002, this strategy seemed to be going nowhere, and then took off. As I was able to get this backtest going back to 1997, it makes me wonder why it was only started in 2003 for the SeekingAlpha article, since even with 1997-2002 thrown in, this strategy’s risk/reward profile still looks fairly solid. CAR about 1 (slightly less, but that’s okay, for something that turns over so infrequently, and in so few securities!), and a Sharpe higher than 1. Certainly better than what the market itself offered over the same period of time for retail investors. Perhaps Cliff Smith himself could chime in regarding his choice of time frame.

In any case, Cliff Smith marketed the strategy as having a higher than 28% CAGR, and his article was published on August 15, 2014, and started from 2003. Let’s see if we can replicate those results.

stratRets <- stratRets["2002-12-31::2014-08-15"]
table.AnnualizedReturns(stratRets)
maxDrawdown(stratRets)
charts.PerformanceSummary(stratRets)
plot(log(cumprod(1+stratRets)))

Which results in this:

> table.AnnualizedReturns(stratRets)
                          portfolio.returns
Annualized Return                    0.2862
Annualized Std Dev                   0.1734
Annualized Sharpe (Rf=0%)            1.6499
> maxDrawdown(stratRets)
[1] 0.1911616

A far improved risk/return profile without 1997-2002 (or the out-of-sample period after Cliff Smith’s publishing date). Here are the two equity curves in-sample.

In short, the results look better, and the SeekingAlpha article’s results are validated.

Now, let’s look at the out-of-sample periods on their own.

stratRets <- Return.portfolio(returns, finalPos)
earlyOOS <- stratRets["::2002-12-31"]
table.AnnualizedReturn(earlyOOS)
maxDrawdown(earlyOOS)
charts.PerformanceSummary(earlyOOS)

Here are the results:

> table.AnnualizedReturns(earlyOOS)
                          portfolio.returns
Annualized Return                    0.0321
Annualized Std Dev                   0.1378
Annualized Sharpe (Rf=0%)            0.2327
> maxDrawdown(earlyOOS)
[1] 0.1927991

And with the corresponding equity curve (which does not need a log-scale this time).

In short, it basically did nothing for an entire five years. That’s rough, and I definitely don’t like the fact that it was left off of the SeekingAlpha article, as anytime I can extend a backtest further back than a strategy’s original author and then find skeletons in the closet (as happened for each and every one of Harry Long’s strategies), it sets off red flags on this end, so I’m hoping that there’s some good explanation for leaving off 1997-2002 that I’m simply failing to mention.

Lastly, let’s look at the out-of-sample performance.

lateOOS <- stratRets["2014-08-15::"]
charts.PerformanceSummary(lateOOS)
table.AnnualizedReturns(lateOOS)
maxDrawdown(lateOOS)

With the following results:

> table.AnnualizedReturns(lateOOS)
                          portfolio.returns
Annualized Return                    0.0752
Annualized Std Dev                   0.1426
Annualized Sharpe (Rf=0%)            0.5277
> maxDrawdown(lateOOS)
[1] 0.1381713

And the following equity curve:

Basically, while it’s ugly, it made new equity highs over only two more transactions (and in such a small sample size, anything can happen), so I’ll put this one down as a small, ugly win, but a win nevertheless.

If anyone has any questions or comments about this strategy, I’d love to see them, as this is basically a first-pass replica. To Mr. Cliff Smith’s credit, the results check out, and when the worst thing one can say about a strategy is that it had a period of a flat performance (aka when the market crested at the end of the Clinton administration right before the dot-com burst), well, that’s not the worst thing in the world.

More replications (including one requested by several readers) will be upcoming.

Thanks for reading.

NOTE: I am a freelance consultant in quantitative analysis on topics related to this blog. If you have contract or full time roles available for proprietary research that could benefit from my skills, please contact me through my LinkedIn here.