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==Updates==
+
go here: [[Optimize_something]]
 
 
* '''2017-01-26''' submission process updated -- only one t-square project to submit to.
 
 
 
==Overview==
 
 
 
In this project you will use what you learned about optimizers to optimize a portfolio.  That means that you will find how much of a portfolio's funds should be allocated to each stock so as to optimize it's performance.  In this case we define "optimal" as maximum Sharpe ratio.
 
 
 
You will leverage the functions you created in the last project that assessed the value of a portfolio with a given set of allocations.
 
 
 
An older version of this project: [[MC1-Project-2-archive]]
 
 
 
==Task==
 
 
 
Implement a Python function named <tt>optimize_portfolio()</tt> in the file <tt>optimization.py</tt> that can find the optimal allocations for a given set of stocks. You should optimize for Sharpe ratio (i.e., maximize Sharpe ratio).
 
 
 
The function should accept as input a list of symbols as well as start and end dates and return a list of floats (as a one-dimensional numpy array) that represents the allocations to each of the equities. You should take advantage of routines developed in the portfolio analysis project to compute daily portfolio value and statistics.  You should cut-and-paste your code for the functions that did this from the last project  into <tt>optimization.py</tt>.
 
 
 
You are given the following inputs for optimizing a portfolio:
 
* A date range to select the historical data to use (specified by a start and end date)
 
* Symbols for equities (e.g., GOOG, AAPL, GLD, XOM). Note: You should support any symbol in the data directory.
 
 
 
Your goal is to find allocations to the symbols that maximize Sharpe ratio.  Assume 252 trading days in a year and a risk free return of 0.0 per day.  You should implement the following API EXACTLY, if you do not your submission will be penalized.
 
 
 
<PRE>
 
import datetime as dt
 
allocs, cr, adr, sddr, sr = \
 
    optimize_portfolio(sd=dt.datetime(2008,1,1), ed=dt.datetime(2009,1,1), \
 
    syms=['GOOG','AAPL','GLD','XOM'], gen_plot=False)
 
</PRE>
 
 
 
Where the returned output is:
 
* allocs: A 1-d Numpy ndarray of allocations to the stocks.  All the allocations must be between 0.0 and 1.0 and they must sum to 1.0.
 
* cr: Cumulative return
 
* adr: Average daily return
 
* sddr: Standard deviation of daily return
 
* sr: Sharpe ratio
 
 
 
The input parameters are:
 
* sd: A datetime object that represents the start date
 
* ed: A datetime object that represents the end date
 
* syms: A list of symbols that make up the portfolio (note that your code should support any symbol in the data directory)
 
* gen_plot: If True, create a plot named <tt>plot.png</tt>
 
 
 
ALL of your code should be present in the single file <tt>optimization.py</tt>
 
 
 
==Template==
 
 
 
Instructions:
 
* Ensure your directory structure has been properly checked out from github.
 
* Implement the <tt>optimize_portfolio()</tt> function in <tt>mc1_p2/optimization.py</tt>.
 
* To execute, run <tt>'''python optimization.py'''</tt> from the <tt>mc1_p2/</tt> directory.
 
 
 
Your solution to the optimization problem should leverage the software you developed in the last assignment.  However '''you cannot call your old file analysis.py,''' you must copy and paste that old code into the single file for this assignment. To test your code, we will be calling <tt>optimize_portfolio()</tt> only.  Make sure the output and plot look like the examples shown below.
 
 
 
==Suggestions==
 
 
 
* Refer to comments in the provided helper code for pointers regarding how to implement it. In order to specify bounds and constraints when using the <tt>scipy.optmize</tt> module, you'll need to use a special syntax explained here: http://docs.scipy.org/doc/scipy/reference/generated/scipy.optimize.minimize.html
 
 
 
* For bounds, you simply need to pass in a sequence of 2-tuples <tt>(&lt;low&gt;, &lt;high&gt;)</tt>. Just remember that you need to supply as many tuples as the number of stocks in your portfolio.
 
 
 
* For constraints, it's a little tricky. You need to pass in a sequence of dicts (dictionaries), one dictionary per constraint. Each dictionary must specify the type of constraint (<tt>'eq'</tt> for equality, or <tt>'ineq'</tt> for inequality), and a function that ''returns 0 only when the input satisfies the constraint'' (this is the same input that is supplied to your evaluation function). E.g. to constrain the sum of all values in the input array to be less than 50, you could pass in the following (lambdas are just anonymous functions defined on-the-spot):
 
constraints = ({ 'type': 'ineq', 'fun': lambda inputs: 50.0 - np.sum(inputs) })
 
 
 
* Use a uniform allocation of 1/n to each of the n assets as your initial guess.
 
 
 
==Example output 1==
 
 
 
Here's an example output for your function. These are actual correct values that you can use to check your work.
 
 
 
<pre>Start Date: 2010-01-01
 
End Date: 2010-12-31
 
Symbols: ['GOOG', 'AAPL', 'GLD', 'XOM']
 
Optimal allocations: [ 5.38105153e-16  3.96661695e-01  6.03338305e-01  -5.42000166e-17]
 
Sharpe Ratio: 2.00401501102
 
Volatility (stdev of daily returns): 0.0101163831312
 
Average Daily Return: 0.00127710312803
 
Cumulative Return: 0.360090826885</pre>
 
 
 
Corresponding comparison plot:
 
 
 
[[File:comparison_optimal.png]]
 
 
 
==Example output 2==
 
<pre>
 
Start Date: 2004-01-01
 
End Date: 2006-01-01
 
Symbols: ['AXP', 'HPQ', 'IBM', 'HNZ']
 
Optimal allocations: [  7.75113042e-01  2.24886958e-01  -1.18394877e-16  -7.75204553e-17]
 
Sharpe Ratio: 0.842697383626
 
Volatility (stdev of daily returns): 0.0093236393828
 
Average Daily Return: 0.000494944887734
 
Cumulative Return: 0.255021425162
 
</pre>
 
 
 
 
 
[[File:Example2.png]]
 
 
 
==Example output 3==
 
<pre>
 
Start Date: 2004-12-01
 
End Date: 2006-05-31
 
Symbols: ['YHOO', 'XOM', 'GLD', 'HNZ']
 
Optimal allocations: [ -3.84053467e-17  7.52817663e-02  5.85249656e-01  3.39468578e-01]
 
Sharpe Ratio: 1.5178365773
 
Volatility (stdev of daily returns): 0.00797126844855
 
Average Daily Return: 0.000762170576913
 
Cumulative Return: 0.315973959221
 
</pre>
 
 
 
==Example output 4==
 
<pre>
 
Start Date: 2005-12-01
 
End Date: 2006-05-31
 
Symbols: ['YHOO', 'HPQ', 'GLD', 'HNZ']
 
Optimal allocations: [ -1.67414005e-15  1.01227499e-01  2.46926722e-01  6.51845779e-01]
 
Sharpe Ratio: 3.2334265871
 
Volatility (stdev of daily returns): 0.00842416845541
 
Average Daily Return: 0.00171589132005
 
Cumulative Return: 0.229471589743
 
</pre>
 
 
 
Minor differences in float values may arise due to different implementations.
 
 
 
==What to turn in==
 
Be sure to follow these instructions exactly!
 
 
 
Via T-Square, submit as attachments (no zip files; refer to schedule for deadline):
 
 
 
* Your code as <tt>optimization.py</tt> (only the function <tt>optimize_portfolio()</tt> will be tested).  Make sure that all necessary code is in that file.
 
* A report <tt>report.pdf</tt> that includes a chart comparing the optimal portfolio with SPY as using the following parameters:<br />Start Date: 2008-06-01, End Date: 2009-06-01, Symbols: ['IBM', 'X', 'GLD']
 
 
 
Unlimited resubmissions are allowed up to the deadline for the project.
 
 
 
==Rubric==
 
 
 
Part 1: Chart is correct [20 points]
 
* -20 no chart or chart is total nonsense
 
* -10 chart wrong shape (incl. wrong time period, etc) xor -5 chart partly wrong shape (diverges from correct halfway through, etc)
 
* -10 chart not normalized xor -5 chart data scale substantially wrong (right shape, normalized to 1, but max/end values wrong, 3.5 instead of 2.5 etc)
 
* -10 missing required data series (didn’t plot one of portfolio or SPY)
 
* -2 chart labels/text unreadable (too small, labels overlap a lot, etc)
 
*Min score: 0.
 
 
 
Part 2: 10 test cases [80 points]<br />We will test your code against 10 cases (8 points per case).  Each case will be deemed "correct" if:
 
* sum(allocations) = 1.0 +- 0.02 (2 points)
 
* Each allocation is between 0 and 1.0 +- 0.02 (negative allocations are allowed if they are very small) (2 points)
 
* Each allocation matches reference solution +- 0.10 (4 points)
 
 
 
==Required, Allowed & Prohibited==
 
 
 
Required:
 
* Your project must be coded in Python 2.7.x.
 
* Your code must run on one of the university-provided computers (e.g. buffet02.cc.gatech.edu).
 
* Use the code for reading in historical data provided in util.py
 
* Your code must run in less than 5 seconds on one of the university-provided computers.
 
 
 
Allowed:
 
* You can develop your code on your personal machine, but it must also run successfully on one of the university provided machines or virtual images.
 
* Your code may use standard Python libraries (except os).
 
* You may use the NumPy, SciPy, matplotlib and Pandas libraries.  Be sure you are using the correct versions.
 
* You may reuse sections of code (up to 5 lines) that you collected from other students or the internet.
 
* Code provided by the instructor, or allowed by the instructor to be shared.
 
 
 
Prohibited:
 
* Any use of global variables.
 
* Any libraries not listed in the "allowed" section above.
 
* Calls to code in any other local files besides util.py (e.g. don't depend on analysis.py being present).
 
* Use of any code other than util.py to read in data.
 
* Use of Python's os module.
 
* Any code you did not write yourself (except for the 5 line rule in the "allowed" section).
 
* Camels and other dromedaries.
 

Latest revision as of 11:01, 1 September 2017