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I recently wrote some Javascript code to generate random fake stock data as I wanted to show a chart that at first glanced looked like real stock data - but all I came up with was pretty noddy. I was just wondering if there are some resources that explain how this might be done "properly" i.e. so you get realistic looking data that has the same patterns that you see in real stock data?

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10 Answers 10

up vote 3 down vote accepted

I had a book Fractal Market Analysis (just got rid of it recently) that talked about the statistical properties of stock prices. Not very useful for investing, but it might have been able to help you.

You'll need something that models a random process with desired statistical properties. Two examples of random processes are Gaussian white noise and a Wiener process (the latter which models Brownian motion and is also the limit of a random walk with small steps).

If I remember right from the Fractal Market Analysis book, there was an assertion that the logarithm of stock prices had characteristics similar to so-called "1/f noise" or "pink noise", so you could try looking for articles on pink noise generation in software. (and then take the results and plug them into e^x) (edit: oops, I misremembered. Looks like it's more like fractional Brownian motion)

(Here's a nice readable essay that talks about the history behind the study of fractal random processes -- and how the flooding of the Nile relates to the stock market -- unfortunately it doesn't get into technical data, but maybe there are search terms like Hurst exponent that can get you started.)

The problem becomes more difficult if you need multiple series of stock data. (in which case there is some correlation between stocks that depends on various common factors e.g. national economy, industry type, etc.) I'm not sure how you could go about that, but start with one random process first.

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Thanks for this. I'll have to get reading! Yeah I see what you mean about multiple stocks - I guess if you want to mimic the stocks in a particular sector say, that tend to go up and down together it's way more complex. Also to get it to look good over different periods - e.g. day, month and year then it looks like a real challenge! –  Mark Rhodes Dec 22 '11 at 9:12
    
It might also be a news that draws suddenly the whole market toward one direction. –  mouviciel Dec 22 '11 at 13:26

Here is the code that I created for my usage. The prices are created for new candle-stick that includes Open, High, Low, Close, and Volume. The new prices are generated based on % of volatility. I used total 5% for prices.

The code is C# based.

public class PriceBar
{
    public DateTime Date { get; set; }
    public double Open { get; set; }
    public double High { get; set; }
    public double Low { get; set; }
    public double Close { get; set; }
    public long Volume { get; set; }
}

public static double GetRandomNumber(double minimum, double maximum)
{
    Random random = new Random();
    return random.NextDouble() * (maximum - minimum) + minimum;
}

public static void GenerateRandomBar(PriceBar newBar)
{
    double fluct = 0.025;
    double volFluct = 0.40;

    //Open is equal to the previous close
    newBar.Open = newBar.Close;
    newBar.Close = GetRandomNumber(newBar.Close - newBar.Close * fluct, newBar.Close + newBar.Close * fluct);
    newBar.High = GetRandomNumber(Math.Max(newBar.Close, newBar.Open), Math.Max(newBar.Close, newBar.Open) + Math.Abs(newBar.Close - newBar.Open) * fluct);
    newBar.Low = GetRandomNumber(Math.Min(newBar.Close, newBar.Open), Math.Min(newBar.Close, newBar.Open) - Math.Abs(newBar.Close - newBar.Open) * fluct);
    newBar.Volume = (long)GetRandomNumber(newBar.Volume * volFluct, newBar.Volume);
}

Usage:

Create an instance of PriceBar, fill the previous bar's prices. Feed the PriceBar instance to the function GenerateRandomBar(). It will return a PriceBar with new values.

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Jason S was close though.

Markets are natural and therefore fractal.

Here is the best way to generate stock markets:

enter image description here

source

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I wanted to reply to Jim Mischel's post above (https://stackoverflow.com/a/8597889/1360592) but since I wanted to include code, I am forced to put my reply here.

Based on Jim Mischel's alorithm, I did the following Java implementation, and it worked well for my needs, generating numbers that when graphed, produced visually appealing, realistic-looking stock ticker prices.

Java:

private float getNextPrice(float oldPrice)
{
    // Instead of a fixed volatility, pick a random volatility
    // each time, between 2 and 10.
    float volatility = _random.nextFloat() * 10 + 2;

    float rnd = _random.nextFloat();

    float changePercent = 2 * volatility * rnd;

    if (changePercent > volatility) {
        changePercent -= (2 * volatility);
    }
    float changeAmount = oldPrice * changePercent/100;
    float newPrice = oldPrice + changeAmount;

    // Add a ceiling and floor.
    if (newPrice < MIN_PRICE) {
        newPrice += Math.abs(changeAmount) * 2;
    } else if (newPrice > MAX_PRICE) {
        newPrice -= Math.abs(changeAmount) * 2;
    }

    return newPrice;

}

Note that, as wiggles pointed out in his comment, I needed to divide percentage by 100 when declaring the changeAmount variable.

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I wrote a quick an dirty javascript version inspired by Peter P.'s response here. I needed to create weekly, yearly and overall trends so this accepts an array of parameters and overlays these to get a more complex (fake) trend.

  function getRandomData(numPoints, center, min, max, cycles)
{
    var result = [];
    var phase = Math.random() * Math.PI;
    var y = center;

    function randomPlusMinus() { return (Math.random() * 2) - 1; }

    $.each(cycles, function(i,thisCycle) {
        thisCycle.phase = Math.random() * Math.PI;
        thisCycle.increment = Math.PI / thisCycle.length;
    });

    for (var i = 0; i < numPoints; i++)
    {
        $.each(cycles, function(i,thisCycle) {
            thisCycle.phase += thisCycle.increment * randomPlusMinus();
            y += (Math.sin(thisCycle.phase) * (thisCycle.variance / thisCycle.length) * (randomPlusMinus() * thisCycle.noise)) + (thisCycle.trend / thisCycle.length);

        });
        if (min) y = Math.max(y,min);
        if (max) y = Math.min(y,max);
        result.push(y);
    }

    return result;
}

var data = getRandomData(365,80,20,100,
                      [{ length: 7, variance: 50, noise: 1, trend: 0},
                       { length: 365, variance: 30, noise: 1, trend: 0},
                       { length: 700, variance: 2, noise: 0, trend: 100}]);

I put a chart on there to show the result: http://jsfiddle.net/z64Jr/3/

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There are several answers that give a fairly textbook answer: use geometric brownian motion to model stock prices. But there's one major reason to consider this wrong. Real stock prices do not behave anything like geometric brownian motion (GBM). I'll explain this in a bit.

The reason GBM is used in textbooks to model a stock price process is for simplicity. It helps you get the theory off the ground and derive some basic results which seem to be "essentially" correct. This doesn't mean you should think that's what stock prices "look like" however. That would be like deriving an equation of motion neglecting friction (which is theoretically very useful) and then thinking this is what motion looks like in real life, e.g. everyone slides around on their shoes like ice skates.

One of the theoretically most useful properties of GBM is that future changes are independent of past changes. Is this true of stock prices? Nope. Not at all. Serial correlation occurs everywhere. Not only that, large decreases are usually followed by increased volatility while large increases are usually followed by decreased volatility.

I suppose I might be accused of nitpicking, but these stylized facts are commonly known to investors and economists, so I think it's fair to say GBM doesn't look realistic to anybody that is familiar with stock market behavior.

Econometricians have come up with plenty of models for stock prices. The one that seems to work in a lot of situations is an autoregressive model for the conditional mean combined with an (G)Arch type model for the volatility. For the volatility model, an assymetric GARCH with a fat-tail distribution (like Student's t) seems to work the best for a variety of financial markets.

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Here's my attempt in ruby! :) This will output a string you can copy and paste into google charts. I allow for positive, negative or no trending of the data. This code could probably be optimized and/or tweaked for randomness/regularity.

Google charts: https://code.google.com/apis/ajax/playground/?type=visualization#line_chart

# In order to generate a semi-realistic looking graph behavior
# we use a sine function to generate period behavior.  In order to avoid
# a graph that is too regular, we introduce randomness at two levels:
# The delta between steps across the x-axis is random, but within a range(deltavariance)
# The wavelength of the sine function is varied by randomly incrementing the index we pass
# to the sine function(sine_index)

# CONFIGURATION VARIABLES
yvalue = 1 # start value
range = 100 # y-range
deltavariance = 10 # allowable variance between changes
sine_index, wavelength = 0, 0.33 #index into our sine function that determines whether we change direction or not
i, maxi = 0, 100 # our counter and its maximum
data = {sine_index => yvalue} # seed our data structure with its first value
trend = :positive # :negative, :none # do we want the graph to trend upwards, downwards or neither
periodmin, periodmax = 0, 0 # vars to enforce trending
direction = 1 # start in a positive direction, -1 for negative

# DO NOT EDIT BELOW THIS LINE
while(i < maxi)

  olddirection = direction
  direction = Math.sin(sine_index).to_f
  direction = direction < 0 ? direction.floor : direction.ceil

  delta = rand(deltavariance) 
  yvalue += delta * direction

  if trend == :positive 
    yvalue = periodmin if yvalue < periodmin
    periodmin = yvalue if olddirection < direction
  elsif trend == :negative
    yvalue = periodmax if yvalue > periodmax
    periodmax = yvalue if olddirection > direction

  end

  data[sine_index] = yvalue
  sine_index += Math.sin(rand) # Math.sin(rand) will give random numbers from -1..1
  i += 1
end

code = <<-CODE
function drawVisualization() {
  // Create and populate the data table.
  var data = google.visualization.arrayToDataTable([
    ['x', 'Cats'],
    DATASTR
  ]);

  // Create and draw the visualization.
  new google.visualization.LineChart(document.getElementById('visualization')).
      draw(data, {curveType: "function",
                  width: 500, height: 400,
                  vAxis: {maxValue: 10}}
          );
}
CODE

datastr = data.collect{|k,v|  "[#{k},#{v}]"}.join(",")
code = code.gsub('DATASTR', datastr)
puts code
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sorry, don't know why the syntax highlight isn't working...see this pastie: pastie.org/8494639 –  Peter P. Nov 20 '13 at 7:02
# The following is an adaptation from a program shown at page 140 in
# "Stochastic Simulations and Applications in Finance",
# a book written by Huynh, Lai and Soumaré.
# That program was written in MatLab and this one was written in R by me.
# That program produced many price paths and this one produces one.
# The latter is also somewhat simpler and faster.

# Y is the time period in years, for instance 1 (year)
# NbSteps is the number of steps in the simulation,
# for instance 250 (trading days in a year).
# DeltaY is the resulting time step.

# The computations shown implement the exact solution
# to the stochastic differential equation for
# the geometric Brownian motion modelling stock prices,
# with mean mu and volatility sigma, thus generating a stochastic price path
# such as that exhibited by stock prices when price jumps are rare.

PricePath <- function(Y,NbSteps,mu,sigma,InitPrice) {
    DeltaY <- Y/NbSteps; SqrtDeltaY <- sqrt(DeltaY)
    DeltaW <- SqrtDeltaY * rnorm(NbSteps)
    Increments <- (mu-sigma*sigma/2)*DeltaY + sigma*DeltaW
    ExpIncr <- exp(Increments)
    PricePath <- cumprod(c(InitPrice,ExpIncr))
    return(PricePath)
}

The plot of the output from this program looks very much like a stock price path:

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Take a look at yahoo finance, they offer free delayed data from the stock exchange and charts.

Here's an article about using the feed: http://www.codeproject.com/KB/aspnet/StockQuote.aspx

You'll need JQuery or you can just use XMLHttpRequest to comsume the service. FYI, there's a plugin for JQuery to process a CSV: http://code.google.com/p/js-tables/

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1  
...or, depending on the need, one could possibly download actual stock price series with long histories (meaning: without on-the-fly updates). –  Predictor Dec 23 '11 at 12:59

A simple algorithm is to use a simple volatility number that restricts how much the stock can change within a given period (say, a single day). The higher the number, the more volatile. So each day you can compute the new price by:

rnd = Random_Float(); // generate number, 0 <= x < 1.0
change_percent = 2 * volatility * rnd;
if (change_percent > volatility)
    change_percent -= (2 * volatility);
change_amount = old_price * change_percent;
new_price = old_price + change_amount;

A stable stock would have a volatility number of perhaps 2%. A volatility of 10% would show some pretty large swings.

Not perfect, but it could look pretty realistic.

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2  
Downvoters: It's customary to supply a reason with a downvote. –  Jim Mischel Dec 22 '11 at 15:19
1  
I've used this just to mess about with a few things, it's great! However maybe it's just my maths but the change amount, doesn't that need to be: change_amount = (old_price / 100) * change_percent; –  wiggles Jul 2 '12 at 15:17
    
I created a Java implementation based on this algorithm which worked very well for my needs. Because you can't post code in a comment, I added a reply down below with the code: stackoverflow.com/a/22355778/1360592 –  Robin Zimmermann Mar 12 at 15:17

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