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=================
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Parallel examples
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=================
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In this section we describe two more involved examples of using an IPython
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cluster to perform a parallel computation. In these examples, we will be using
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IPython's "pylab" mode, which enables interactive plotting using the
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Matplotlib package. IPython can be started in this mode by typing::
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ipython --pylab
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at the system command line.
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150 million digits of pi
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========================
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In this example we would like to study the distribution of digits in the
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number pi (in base 10). While it is not known if pi is a normal number (a
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number is normal in base 10 if 0-9 occur with equal likelihood) numerical
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investigations suggest that it is. We will begin with a serial calculation on
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10,000 digits of pi and then perform a parallel calculation involving 150
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million digits.
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In both the serial and parallel calculation we will be using functions defined
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in the :file:`pidigits.py` file, which is available in the
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:file:`docs/examples/parallel` directory of the IPython source distribution.
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These functions provide basic facilities for working with the digits of pi and
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can be loaded into IPython by putting :file:`pidigits.py` in your current
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working directory and then doing:
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.. sourcecode:: ipython
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In [1]: run pidigits.py
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Serial calculation
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------------------
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For the serial calculation, we will use `SymPy <http://www.sympy.org>`_ to
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calculate 10,000 digits of pi and then look at the frequencies of the digits
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0-9. Out of 10,000 digits, we expect each digit to occur 1,000 times. While
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SymPy is capable of calculating many more digits of pi, our purpose here is to
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set the stage for the much larger parallel calculation.
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In this example, we use two functions from :file:`pidigits.py`:
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:func:`one_digit_freqs` (which calculates how many times each digit occurs)
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and :func:`plot_one_digit_freqs` (which uses Matplotlib to plot the result).
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Here is an interactive IPython session that uses these functions with
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SymPy:
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.. sourcecode:: ipython
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In [7]: import sympy
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In [8]: pi = sympy.pi.evalf(40)
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In [9]: pi
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Out[9]: 3.141592653589793238462643383279502884197
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In [10]: pi = sympy.pi.evalf(10000)
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In [11]: digits = (d for d in str(pi)[2:]) # create a sequence of digits
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In [12]: run pidigits.py # load one_digit_freqs/plot_one_digit_freqs
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In [13]: freqs = one_digit_freqs(digits)
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In [14]: plot_one_digit_freqs(freqs)
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Out[14]: [<matplotlib.lines.Line2D object at 0x18a55290>]
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The resulting plot of the single digit counts shows that each digit occurs
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approximately 1,000 times, but that with only 10,000 digits the
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statistical fluctuations are still rather large:
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.. image:: figs/single_digits.*
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It is clear that to reduce the relative fluctuations in the counts, we need
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to look at many more digits of pi. That brings us to the parallel calculation.
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Parallel calculation
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--------------------
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Calculating many digits of pi is a challenging computational problem in itself.
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Because we want to focus on the distribution of digits in this example, we
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will use pre-computed digit of pi from the website of Professor Yasumasa
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Kanada at the University of Tokyo (http://www.super-computing.org). These
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digits come in a set of text files (ftp://pi.super-computing.org/.2/pi200m/)
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that each have 10 million digits of pi.
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For the parallel calculation, we have copied these files to the local hard
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drives of the compute nodes. A total of 15 of these files will be used, for a
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total of 150 million digits of pi. To make things a little more interesting we
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will calculate the frequencies of all 2 digits sequences (00-99) and then plot
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the result using a 2D matrix in Matplotlib.
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The overall idea of the calculation is simple: each IPython engine will
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compute the two digit counts for the digits in a single file. Then in a final
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step the counts from each engine will be added up. To perform this
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calculation, we will need two top-level functions from :file:`pidigits.py`:
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.. literalinclude:: ../../examples/parallel/pi/pidigits.py
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:language: python
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:lines: 47-62
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We will also use the :func:`plot_two_digit_freqs` function to plot the
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results. The code to run this calculation in parallel is contained in
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:file:`docs/examples/parallel/parallelpi.py`. This code can be run in parallel
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using IPython by following these steps:
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1. Use :command:`ipcluster` to start 15 engines. We used 16 cores of an SGE linux
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cluster (1 controller + 15 engines).
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2. With the file :file:`parallelpi.py` in your current working directory, open
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up IPython in pylab mode and type ``run parallelpi.py``. This will download
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the pi files via ftp the first time you run it, if they are not
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present in the Engines' working directory.
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When run on our 16 cores, we observe a speedup of 14.2x. This is slightly
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less than linear scaling (16x) because the controller is also running on one of
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the cores.
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To emphasize the interactive nature of IPython, we now show how the
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calculation can also be run by simply typing the commands from
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:file:`parallelpi.py` interactively into IPython:
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.. sourcecode:: ipython
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In [1]: from IPython.parallel import Client
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# The Client allows us to use the engines interactively.
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# We simply pass Client the name of the cluster profile we
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# are using.
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In [2]: c = Client(profile='mycluster')
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In [3]: v = c[:]
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In [3]: c.ids
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Out[3]: [0, 1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13, 14]
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In [4]: run pidigits.py
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In [5]: filestring = 'pi200m.ascii.%(i)02dof20'
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# Create the list of files to process.
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In [6]: files = [filestring % {'i':i} for i in range(1,16)]
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In [7]: files
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Out[7]:
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['pi200m.ascii.01of20',
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'pi200m.ascii.02of20',
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'pi200m.ascii.03of20',
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'pi200m.ascii.04of20',
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'pi200m.ascii.05of20',
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'pi200m.ascii.06of20',
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'pi200m.ascii.07of20',
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'pi200m.ascii.08of20',
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'pi200m.ascii.09of20',
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'pi200m.ascii.10of20',
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'pi200m.ascii.11of20',
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'pi200m.ascii.12of20',
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'pi200m.ascii.13of20',
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'pi200m.ascii.14of20',
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'pi200m.ascii.15of20']
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# download the data files if they don't already exist:
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In [8]: v.map(fetch_pi_file, files)
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# This is the parallel calculation using the Client.map method
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# which applies compute_two_digit_freqs to each file in files in parallel.
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In [9]: freqs_all = v.map(compute_two_digit_freqs, files)
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# Add up the frequencies from each engine.
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In [10]: freqs = reduce_freqs(freqs_all)
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In [11]: plot_two_digit_freqs(freqs)
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Out[11]: <matplotlib.image.AxesImage object at 0x18beb110>
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In [12]: plt.title('2 digit counts of 150m digits of pi')
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Out[12]: <matplotlib.text.Text object at 0x18d1f9b0>
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The resulting plot generated by Matplotlib is shown below. The colors indicate
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which two digit sequences are more (red) or less (blue) likely to occur in the
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first 150 million digits of pi. We clearly see that the sequence "41" is
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most likely and that "06" and "07" are least likely. Further analysis would
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show that the relative size of the statistical fluctuations have decreased
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compared to the 10,000 digit calculation.
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.. image:: figs/two_digit_counts.*
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Parallel options pricing
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========================
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An option is a financial contract that gives the buyer of the contract the
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right to buy (a "call") or sell (a "put") a secondary asset (a stock for
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example) at a particular date in the future (the expiration date) for a
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pre-agreed upon price (the strike price). For this right, the buyer pays the
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seller a premium (the option price). There are a wide variety of flavors of
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options (American, European, Asian, etc.) that are useful for different
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purposes: hedging against risk, speculation, etc.
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Much of modern finance is driven by the need to price these contracts
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accurately based on what is known about the properties (such as volatility) of
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the underlying asset. One method of pricing options is to use a Monte Carlo
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simulation of the underlying asset price. In this example we use this approach
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to price both European and Asian (path dependent) options for various strike
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prices and volatilities.
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The code for this example can be found in the :file:`docs/examples/parallel/options`
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directory of the IPython source. The function :func:`price_options` in
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:file:`mckernel.py` implements the basic Monte Carlo pricing algorithm using
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the NumPy package and is shown here:
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.. literalinclude:: ../../examples/parallel/options/mckernel.py
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:language: python
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To run this code in parallel, we will use IPython's :class:`LoadBalancedView` class,
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which distributes work to the engines using dynamic load balancing. This
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view is a wrapper of the :class:`Client` class shown in
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the previous example. The parallel calculation using :class:`LoadBalancedView` can
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be found in the file :file:`mcpricer.py`. The code in this file creates a
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:class:`LoadBalancedView` instance and then submits a set of tasks using
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:meth:`LoadBalancedView.apply` that calculate the option prices for different
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volatilities and strike prices. The results are then plotted as a 2D contour
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plot using Matplotlib.
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.. literalinclude:: ../../examples/parallel/options/mcpricer.py
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:language: python
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To use this code, start an IPython cluster using :command:`ipcluster`, open
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IPython in the pylab mode with the file :file:`mckernel.py` in your current
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working directory and then type:
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.. sourcecode:: ipython
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In [7]: run mcpricer.py
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Submitted tasks: 30
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Once all the tasks have finished, the results can be plotted using the
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:func:`plot_options` function. Here we make contour plots of the Asian
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call and Asian put options as function of the volatility and strike price:
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.. sourcecode:: ipython
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In [8]: plot_options(sigma_vals, strike_vals, prices['acall'])
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In [9]: plt.figure()
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Out[9]: <matplotlib.figure.Figure object at 0x18c178d0>
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In [10]: plot_options(sigma_vals, strike_vals, prices['aput'])
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These results are shown in the two figures below. On our 15 engines, the
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entire calculation (15 strike prices, 15 volatilities, 100,000 paths for each)
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took 37 seconds in parallel, giving a speedup of 14.1x, which is comparable
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to the speedup observed in our previous example.
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.. image:: figs/asian_call.*
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.. image:: figs/asian_put.*
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Conclusion
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==========
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To conclude these examples, we summarize the key features of IPython's
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parallel architecture that have been demonstrated:
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* Serial code can be parallelized often with only a few extra lines of code.
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We have used the :class:`DirectView` and :class:`LoadBalancedView` classes
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for this purpose.
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* The resulting parallel code can be run without ever leaving the IPython's
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interactive shell.
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* Any data computed in parallel can be explored interactively through
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visualization or further numerical calculations.
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* We have run these examples on a cluster running RHEL 5 and Sun GridEngine.
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IPython's built in support for SGE (and other batch systems) makes it easy
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to get started with IPython's parallel capabilities.
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