Markets are said to be "efficient". An efficient market is by definition unpredictable - no matter the amount of ML, computation, or indicators thrown at it. In particular, in an efficient market, TA will not be of help.

An illustration of efficient markets is the WSJ's longstanding monkey vs. human contest:Blindfolded Monkey Beats Humans With Stock Picks, granted there are several flaws to it.

BTC is a relatively new market. New markets are typically highly inefficient (easier to make money) and become more and more efficient over time (harder to make money). How much more efficient is BTC becoming?

We apply the Variance Ratio method and apply it to BTC .

BACKGROUND ON THE VARIANCE RATIO METHOD

Based on 1988 MacKinlay's seminal paper "Stock Market Prices do not Follow a Random Walk", the idea is to exploit a phenomenon called "variance scaling".

For those keen on looking into the math, the short version of it is under the assumption of iid (random walk) we have the following:

H0: Var(Sum(returns over K bars))=Sum(Var(returns over 1 bar))=k*Var(return over 1 bar)

We look to reject or not H0 depending on the observations.

In this script, we compare the variance of the (log) returns for the chart selected between:

(1) The (average) variance over k bars (call this Vk )

(2) The (average) variance over 1 bar (call this V1)

H0 simply says that Vk=k*V1 if the stock follows a random walk.

We compute the Variance Ratio VR (k)=Variance(returns over k bar)/(Sum(Var(returns over 1 bar)))-1

We then compute the associated Z-score which we chart out for a configurable k number of bars.

HOW TO INTERPRET THE CHART

The line drawn is the Z-Score for VR (k). It represents the number of standard deviations of VR (k) from 0 - the further out, the less random.

- If the line is close / hovers around 0, the ticker appears to follow a random walk (i.e. may not be predictable)

- If the line is consistently > 2 or <-2, the ticker likely does not follow a random walk (i.e. may have predictable features)

- If the line is positive, it means that the Variance on the k bars is larger than the variance on 1 bar (more variance on longer timeframes)

- If the line is negative, it means that the Variance on the k bars is smaller than the variance on 1 bar (more variance on smaller timeframes)

USE CASES

- Identify timeframes where you won't be able to make money

- Identify whether a stock cannot be predicted (forget about TA, indicators etc. -- a random walk is not predictable)

- Identify whether a stock is becoming less and less predictable (Z-score amplitude will decrease over time)

FEATURES

- select the number of K bar to compare vs. 1 bar (default = 16) - ideally a power of 2 but any other number will work. The chart is based off this selection

- select the lookback period for the analysis (500 bars by default)

- select the source to analyze (default = close, but you may select other inputs to calculate the returns from)

- results form the statistical tests on different K's in the table on the right/bottom side of the chart (H0 rejected = not random walk; H0 not rejected = it essentially looks rather random and we can't conclude that it's not a random walk)

COMMENTARY ON BTC

- It appears BTC's absolute value of the ZScore on the Variance Ratio is declining year after year - corroborating an increasingly efficient market as new participants join.

- However, we can still detect a fair amount of potential inefficiency using this simple test.

As usual, this is not investment advice. DYOR.

With love,

🐵BCT🐵