Difference between revisions of "Phylogenetics: Python Primer"
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[[Image: Mac_logo.jpg]] If you have a Mac, download [http://www.barebones.com/products/textwrangler/ TextWrangler]
[[Image: Mac_logo.jpg]] If you have a Mac, download [http://www.barebones.com/products/textwrangler/ TextWrangler].Once you get TextWrangler installed, start it up and create a file with the contents shown below (after the instructions for Windows users). Save the file using the name <tt>first.py</tt> in a convenient location (e.g. <tt>Documents/scripts</tt>), then navigate to that folder in your Terminal window (using the command <tt>cd $HOME/Documents/scripts</tt>) <br style="clear: left"/>
Revision as of 17:33, 22 January 2014
|EEB 349: Phylogenetics|
|This lab represents an introduction to the Python computing language, which will be useful for upcoming homework assignments as well as for software written as Python extensions (i.e. Phycas)|
- 1 What is Python?
- 2 Installing Python
- 3 Installing Python documentation
- 4 Python basics
- 4.1 Kinds of information you can store in Python variables
- 4.2 Arithmetic
- 5 Using what you know
- 6 Loops
- 7 Python script files
- 8 Fancier print statements
- 9 Computing the Sum-of-Squares
- 10 Files
What is Python?Python is one of two programming languages that we will use this semester (the other being R). One might make the case that programs like PAUP that are associated with a unique command language also represent programming languages; however, Python and R are different in being general purpose (i.e. not written specifically for phylogenetics).
Python is one of a number of different high-level computing languages in common use. All of the software we use is written in one of these languages. PAUP is written entirely in the C language, while BEAST is written in Java. Knowing a little bit of computer programming can save you immense amounts of time by allowing you to automate things. You will begin realizing these savings doing homework for this class. While it is possible to do all the homework assignments by hand using a calculator, you will find that using Python will save you time and is more accurate (a mistake on a calculator early on in a calculation can be very costly in terms of time and accuracy). Python is a good language to learn first because it is relatively simple (not many words or punctuation rules to learn) and is much more forgiving than other languages. It is in a class of languages known as scripting languages because the program is interpreted as it is read - languages such as C require two additional steps (compiling and linking) before they can be run.
$ python -V Python 2.5.1
The -V option does not leave you in the python environment, so go ahead and type python at the operating system's prompt to start python in interactive mode. Here is what it looks like on my Mac (the part I typed is in bold):
paul-lewiss-macbook-pro:Phylogenetics plewis$ python Python 2.5.1 (r251:54863, Apr 15 2008, 22:57:26) [GCC 4.0.1 (Apple Inc. build 5465)] on darwin Type "help", "copyright", "credits" or "license" for more information. >>>
http://www.python.org/download/ web site. Note that there are two current versions of Python. You should install the older one (Python 2.7.6). (We would use Python 3.1 except that some Python software that we will use later in the semester is not yet compatible with Python 3.1, so it makes sense to stick with 2.7 for now.) There are several different types of downloads: choose Python 2.7.6 Windows Installer (Windows binary -- does not include source) and follow the directions once you start it up.
Once you have Python installed, you can invoke it in Windows 7 using Start > All Programs > Python 2.7 > Python (command line). The console window that opens should show the version at the top, and you should see the python prompt, which consists of three greater-than symbols in a row: >>>. You can also choose Start > All Programs > Python 2.7 > IDLE (Python GUI) if you prefer the look and feel of the IDLE python interpreter over the windows console.
Installing Python documentation
You should download the documentation from http://docs.python.org/download.html so that it can be accessed quickly. I find the HTML form best: I unpacked the zip file and bookmarked it in my browser as follows:
This is the briefest of introductions, designed to get you just to the point where you can do the majority of your homework assignments using Python. If you get stuck trying to write a Python program, I have found the Tutorial and Global Index to be the most useful parts of the Python documentation.
Kinds of information you can store in Python variables
Try typing in the Python code presented in the example sessions below. The >>> represents the Python prompt (you will see this when you start Python), so don't type that! The output is shown below each Python statement that generates output (don't type that either!). Finally, everything after a # character represents a comment (while you can type these in, it would be a waste of time unless you just want practice typing).
Integers, floats and strings
Strings are series of characters. Assign the string 'Have a nice day' to the variable s:
>>> s = 'Have a nice day'
You can see what is stored in a variable by simply typing the variable and hitting return:
>>> s 'Have a nice day'
Integers are whole positive or negative numbers. Assign the integer 9 to the variable i:
>>> i = 9
Floats are numbers with an implicit or explicit decimal point. Assign the float 9.5 to the variable f:
>>> f = 9.5
A little warning is in order about types of numbers. I would use float for all calculations. You can get yourself into trouble using integers. For example, type the following, which divides the integer 2 by the integer 4:
>>> 2/4 0
Not what you expected? Now do the same thing, except use floats instead of integers:
>>> 2./4. 0.5
The problem is that 2/4 gives you the number of times 4 can cleanly divide into 2; because 4 is already bigger than 2, the result is 0. The lesson here is that if you want a float result, you should use floats as input, and most of the time you do want a float result. You can also explicitly specify that an integer should be converted to a float before it is used in the calculation:
>>> n = 2 >>> float(n)/4.0 0.5
Later on you will learn how to read data from a file. When numbers are read from a file, they start out as strings. If you want these strings to be used as numbers, you will need to convert them to integers or floats. Here is how to convert a string ('5') to an integer:
>>> x = int('5') >>> x 5
Here is another attempt to convert a string to an integer. This one fails because the string '5.5' is not able to be converted to an integer:
>>> x = int('5.5') Traceback (most recent call last): ... ValueError: invalid literal for int() with base 10: '5.5'
Here is how to convert a string to a float:
>>> y = float('5.5') >>> y 5.5
Lists and tuples
Lists are collections of integers, floats, strings, etc. Tuples are like lists, except that you cannot change elements of a tuple. Here is a list consisting of the integer, the float and the string we just defined:
>>> L = [i, f, s] >>> L [9, 9.5, 'Have a nice day']
Change the first (0th) value in the list to 5. Note that the first element of a list or tuple is 0, not 1, in Python.
>>> L = 5 >>> L [5, 9.5, 'Have a nice day']
Change the second value in the list to 13 (note that this will also change the second element from a float to an integer):
>>> L = 13 >>> L [5, 13, 'Have a nice day']
Change the last value in the list to the string 'OK':
>>> L = 'OK' >>> L [5, 13, 'OK']
Change the last value in the list to "G'day":
>>> L[-1] = "G'day" >>> L [5, 13, "G'day"]
This last example illustrates two things. First, the elements can be accessed by counting backward from the number of elements. Hence, L[-1] refers to the same element as L[3-1] = L (i.e., the last element). Second, you can embed an apostrophe inside a string by using double quotes to surround the string, and you could embed double quotes inside a string by using single quotes to surround it.
You can find out how many elements are in the list using the len() function:
>>> len(L) 3
Here is a tuple consisting of the integer, the float and the string we just defined
>>> t = (i, f, s) >>> t (9, 9.5, 'Have a nice day')
Try changing the first element of the tuple (this will generate an ugly error message because tuples cannot be modified):
>>> t = 5 Traceback (most recent call last): ... TypeError: 'tuple' object does not support item assignment
To eliminate possible ambiguities, every tuple must have at least one comma, even if it only has just one element!
>>> t = (1.2,)
If t =(1,2,3,4), you can assing the 4 elements of the tuple t to the 4 variables a, b, c and d like this:
>>> a,b,c,d = t >>> a 1 >>> b 2 >>> c 3 >>> d 4
Below are some examples of basic arithmetic operations in Python.
Add 1 plus 2:
>>> x = 1 + 2 >>> x 3
Multiply 2 and 3:
>>> x = 2*3 >>> x 6
Raise 2 to the power 3:
>>> x = 2**3 >>> x 8
Divide the integer 6 by the integer 2:
>>> x = 6/2 >>> x 3
Divide the float 6.0 by the float 2.0:
>>> x = 6.0/2.0 >>> x 3.0
Order of operations
In the following expression, the multiplication is done before the division because operations with equal precedence are evaluated from left to right:
>>> x = 6*7/3 >>> x 14
If you want the division to be done first, use parentheses:
>>> x = 6*(7/3) >>> x 12
Why does the order matter? It wouldn't in this case if you had used floats, but (once again), note that 7/3 yields 2, not 2.33333 because an integer divided by another integer yields an integer, and integers cannot have a fractional component (the value is truncated, not rounded). If this is not what you wanted, you need to use floats, which you can do by inserting a decimal point after each whole number:
>>> x = 6.*(7./3.) >>> x 14.0
Some operations are evaluated before others due to their higher precedence. For example, exponentiation has higher precedence than multiplication or division, so the ** is done before the multiplcation here:
>>> x = 2*2**3 >>> x 16
I strongly encourage you to use parentheses, however, to make the order of calculation explicit:
>>> x = 2*(2**3) >>> x 16
Multiplication and division, in turn, have higher precedence than addition or subtraction. For the full operator precedence table, scroll to the bottom of the expressions documentation
Sum, min and max
The sum function makes it easy to sum the elements of a list:
>>> x = sum([1,2,3,4]) >>> x 10
The min and max functions make it easy to find the extreme values in a list:
>>> z = [1,2,3,4] >>> max(z) 4 >>> min(z) 1
Creative ways of creating lists
The range(x,y,z) function generates a list of integers starting with x, ending just before y (y itself will not be included in the list), and skipping z integers between each one included:
>>> odd_numbers = range(1,10,2) >>> odd_numbers [1, 3, 5, 7, 9]
Something called a list comprehension allows you to manipulate the values of one list while creating new list from the manipulated values. In the example below, I create a new list that contains every value in oldlist multiplied by 2:
>>> oldlist = [1,2,3,4,5] >>> newlist = [x*2 for x in oldlist] >>> newlist [2, 4, 6, 8, 10]
Using what you know
You already know enough Python to start using it to do phylogenetics!
Computing p-distances from numbers of differences
The first step in an upcoming homework assignment is to compute p-distances (the fraction of sites that are different) from the supplied numbers of differences. Here is one way to do this in Python:
>>> n = 3424 # store sequence length in variable n >>> x = 293 # store number of differences between taxon1 and taxon2 in x >>> p = x/n # do the division >>> p 0
Ok, you know that's not the right answer, so what went wrong? We divided one integer by another integer to produce a third integer, but instead of storing the number 0.085572429906542055 in p, it stored 0 because that is the whole number part of 0.085572429906542055. Sorry to beat this point into the ground, but it is hard to stess too much that you should be using floats when doing calculations! Here is how to be sure you are working with floats:
>>> p = float(x)/float(n) >>> p 0.085572429906542055
Note that the trick of including the decimal point doesn't work on variables, only on actual numbers:
>>> p = x./n. File "<stdin>", line 1 p = x./n. ^ SyntaxError: invalid syntax
You can, however make the variables involved into floats when you first assign values to them. The following solution uses decimal points to save some typing and will prevent you from being surprised by later calculations involving n and/or x:
>>> n = 3424. # the period at the end makes n a float instead of an integer >>> x = 293. >>> p = x/n >>> p 0.085572429906542055
This time p is a float because you divided one float by another.
Computing a JC distance from a p-distance
The next step is to convert your p-distance to a JC distance. The JC distance provides an estimate of the number of substitutions that have occurred per site. This is greater than the p-distance because some substitutions can mask the effects of other substitutions (for example, an A can change to a T and then back to an A again, appearing as 0 substitutions when in fact there were 2).
To compute the JC distance, we need some capabilities (e.g. the ability to take the logarithm of a number) that are not present by default when Python starts up. To solve this deficiency, use the import statement to bring in the needed functionality:
>>> import math >>> jc = -0.75*math.log(1.0 - 4.0*p/3.0) >>> jc 0.090860500068600705
In the import math statement, the math part is known as a Python module. To see a list of all modules (and documentation for them), check out the Global Module List in the Python documentation.
Note that using "import math" requires us to use the prefix "math." in front of every function imported. You can save some typing by being explicit about what functions you want to import from the math module:
>>> from math import log,exp >>> jc = -0.75*log(1.0 - 4.0*p/3.0) >>> jc 0.090860500068600705
I've imported both the log (logarithm) function as well as the exp (exponental function) even though I ended up using just log. Note that this time I did not need to specify math.log; I was able to just use "log" by itself.
How do you know what there is to import from a module? One way is to visit the module's documentation, but you can also get python to provide a list of everything in the module (but noite that you have to import the module before you can list its contents):
>>> import math >>> dir(math) ['__doc__', '__file__', '__name__', '__package__', 'acos', 'acosh', 'asin', 'asinh', 'atan', 'atan2', 'atanh', 'ceil', 'copysign', 'cos', 'cosh', 'degrees', 'e', 'erf', 'erfc', 'exp', 'expm1', 'fabs', 'factorial', 'floor', 'fmod', 'frexp', 'fsum', 'gamma', 'hypot', 'isinf', 'isnan', 'ldexp', 'lgamma', 'log', 'log10', 'log1p', 'modf', 'pi', 'pow', 'radians', 'sin', 'sinh', 'sqrt', 'tan', 'tanh', 'trunc']
An important component of any programming language is the ability to do the same sort of thing many times. In the session that follows, you will create a list containing all six pairwise differences among sequences, then use a for loop to compute the JC distance for all six. Important: use a tab to indent. Python is very sensitive about indenting. If the three indented lines are not indented by exactly the same amount, Python will spit out an error message.
>>> from math import log >>> n = 3424. >>> x = [293.0, 277.0, 328.0, 268.0, 353.0, 353.0] >>> jc =  # start with an empty list >>> for i in range(6): ... p = x[i]/n # compute p-distance using the ith value in the x list ... d = -0.75*log(1.0 - 4.0*p/3.0) # compute the JC distance and store in variable d ... jc.append(d) # lengthen the list jc by appending the new value d ... # just hit return here to exit the loop body >>> jc [0.090860500068600705, 0.085604236767267153, 0.1024886399705747, 0.082663697169458011, 0.11090623674796182, 0.11090623674796182]
You may be curious about range(6). We saw the range function earlier, but there I told you it required three values: start, stop, and step. It turns out that if you only supply one value, python interprets that value as the stop value, assuming start = 0 and step = 1. The range(n) function thus produces a list of integers starting with 0 and ending with n-1. Try typing the range function by itself to verify this:
>>> range(10) [0,1,2,3,4,5,6,7,8,9]
Your for loop could therefore have been written like this and the result would be exactly the same:
for i in [0,1,2,3,4,5]:
Now, what does the line above mean? The for loop lets i take on each value in the list, in turn. Thus, the indented portion of the loop is executed 6 times, once for each value in the list.
Python script files
Now that your Python constructs are getting a little longer, it is a good time to learn about creating files for your Python programs. A file containing Python statements is called a Python script. It is a good idea to have a good text editor before starting to create scripts, so your next goal will be to download one if you do not already have one installed.
Install a text editor
Fortunately, there are free (and really good) text editors for both Windows and Macs.
If you have a Mac, download TextWrangler.Once you get TextWrangler installed, start it up and create a file with the contents shown below (after the instructions for Windows users). Save the file using the name first.py in a convenient location (e.g. Documents/scripts), then navigate to that folder in your Terminal window (using the command cd $HOME/Documents/scripts)
If you have Windows, download Notepad++. Once you get Notepad++ installed, start it up and create a file with the contents shown below. Save the file using the name first.py in a convenient location (e.g. C:\scripts), then navigate to that folder in your command console (using the command cd C:\scripts)
Your first Python script
Here is what you should type into your new first.py file:
import math n = 3424. x = [293.0, 277.0, 328.0, 268.0, 353.0, 353.0] jc =  for i in range(6): p = x[i]/n d = -0.75*math.log(1.0 - 4.0*p/3.0) jc.append(d) print jc
Note that I have added the word print on the last line. This is because our little trick of getting Python to tell us the value of a variable by placing the variable's name on a line by itself only works when you are using Python interactively. We are now switching to programming mode, where an entire script is given to the Python interpreter, and a print statement must be used in this context. The result should be the same.
Try running your script by typing the following at your operating system prompt (i.e. get out of Python if you are already in it by typing Ctrl-d if you are a Mac user or Ctrl-z if you are a Windows user):
Fancier print statements
The program first.py spits out six JC distance values, but it is usually good to format the output so that it is clearer than this. Copy the following into a new text file named second.py and try running it:
import math n = 3424. x = [293.0, 277.0, 328.0, 268.0, 353.0, 353.0] for i in range(6): p = x[i]/n d = -0.75*math.log(1.0 - 4.0*p/3.0) print '%12d %12.5f %12.8f' % (i, p, d)
You will note a couple of differences between first.py and second.py. First, there is no jc list anymore, we just print out values as they are computed. Second, the print statement is much more complicated now! The complexity might be daunting at first, but you will quickly become adjusted to it I think. Here is how the print statement used in second.py works. There are two parts separated by a percent symbol. The first part is a string:
'%12d %12.5f %12.8f'
while the second part is a tuple:
(i, p, d)
The string serves as a format specification. Here is a breakdown:
- %12d says print an integer (d is code for integer here) using 12 spaces
- %12.5f says print a float (f is code for float here) using 12 spaces total, with 5 of the 12 being devoted to the part after the decimal point
- %12.8f says print another float using 12 spaces, this time with 8 of the 12 being after the decimal point
The tuple provides the values to insert: the integer stored in the variable i will go in the first spot, while the floats stored in p and d will go in the second and third spots. Be sure to use "d" for integers and "f" for floats in your format string, otherwise Python will complain.
Run second.py and see if Python spaced everything as you expected. Note that the second float will actually take up 13 spaces because there is a single space in the format string just before the %12.5f specification. Spaces in the format string are inserted as is into the print output.
Computing the Sum-of-Squares
The next step in your homework assignment involves computing the sum-of-squares for each of the two trees provided. The sum-of-squares formula given in lecture (for the case of power=2) is:
Let's create a Python script that will spit out the numbers we need for the table labeled "SS for Tree 1" in the homework assignment. Here is the script (the parts in bold will be discussed in more detail below); save it as ss1.py:
import math n = 3424. rowname = ['1 vs. 2', '1 vs. 3', '1 vs. 4', '2 vs. 3', '2 vs. 4', '3 vs. 4'] path = [0.3, 0.3, 0.2, 0.2, 0.3, 0.3] x = [293.0, 277.0, 328.0, 268.0, 353.0, 353.0] totalSS = 0.0 for i in range(6): pdist = x[i]/n dij = -0.75*math.log(1.0 - 4.0*pdist/3.0) pij = path[i] numerator = (dij - pij)**2.0 denominator = dij**2.0 SS = numerator/denominator totalSS += SS print '%12s %12.5f %12.5f %12.5f' % (rowname[i], pij, dij, SS) print 'total SS = %.5f' % totalSS
Here are the new additions:
- A rowname variable has been added to which is assigned a list of strings. Each element of rowname will serve as the label for a row in the table that is output
- A path variable has been added to which has been assigned a list of path lengths through Tree 1. Each element of path is the path length for the corresponding comparison named in rowname
- A variable named totalSS was added to keep track of the sum of the individual pairwise SS values as they are calculated. Note that we have to initialize the value of totalSS to zero before the loop begins
- I've introduced a pij variable to hold the current path length
- The numerator and denominator variables hold the top and bottom parts of the SS calculation. The double-asterisk means "raised to the power of"
- The SS variable holds the sum-of-squares value for pairwise comparison i
- The totalSS += SS tells Python that we want to add the current value of SS to the running sum being stored in the variable totalSS
- The last line prints the value of totalSS. Note that if there is only one value to be substituted in a format string, you needn't make it into a tuple (i.e. no parentheses are needed around totalSS)
Try running this script and let me know if you don't understand how it works.
One of the most fundamental tasks in programming is to read information stored in an input file and write the program's output to an output file. Here are the absolute basics of doing this in Python.
Reading data from a file
Suppose you wanted to read in the six values that we've been storing in the variable x from a file. To experiment with this, we'll need a file. Create a file named ss1.txt using your text editor that contains the six numbers, one per line. It should look like this:
293.0 277.0 328.0 268.0 353.0 353.0
To read these values, add these five lines to your ss1.py file and comment out the line that currently defines x (place a pound sign # in front of the x):
lines = open('ss1.txt','r').readlines() x =  for line in lines: f = float(line) x.append(f) # x = [293.0, 277.0, 328.0, 268.0, 353.0, 353.0]
The first line above opens a file named ss1.txt for reading (this is what the 'r' means). The readlines() part causes the entire contents of the file to be read, creating a list in which each element is a separate line from the file. This list is stored in the variable lines.
The for loop visits each element in lines one at a time. This represents a different (more convenient) style of for loop that doesn't require us to know how long the lines list is (that is, this style avoids having to use range(n), which would require us to know n). Inside the for loop, the string read from one particular line in the file is stored in the variable line. The string in line is converted to a float named f, which is then appended to the growing list x. After all is said and done, the variable x will be exactly the same (a list of six float values) that it was before when we defined it directly.
Note that we had to explicitly convert each line into a float value. This is because each line of information read from the file is stored as a string, not a float. If you failed to explicitly convert each value, you would later run into trouble when you tried to do arithmetic with the values stored in x.
Writing output to a file
Writing to a file involves creating a Python variable that represents the file, then calling that variable's write function to spit out something to the file. Create a file for writing (note the 'w' for writing rather than 'r' for reading) as follows:
outfile = open('output.txt', 'w')
You can now write something to it like this:
One big difference between writing to a file versus printing to the terminal is that the write function does not terminate the line. The end-of-line character is designated using the two-character combination \n. Thus, if you wanted two blank lines between the word "Hello" and "Goodbye" you would do this:
When you are finished writing to the file (say, as the last line of your script), be sure to close the file:
A revised script
import math n = 3424. rowname = ['1 vs. 2', '1 vs. 3', '1 vs. 4', '2 vs. 3', '2 vs. 4', '3 vs. 4'] path = [0.3, 0.3, 0.2, 0.2, 0.3, 0.3] # Here is where we read in the x values from a file lines = open('ss1.txt','r').readlines() x =  for line in lines: f = float(line) x.append(f) # Here we create an output file outf = open('output.txt', 'w') totalSS = 0.0 for i in range(6): pdist = x[i]/n dij = -0.75*math.log(1.0 - 4.0*pdist/3.0) pij = path[i] numerator = (dij - pij)**2.0 denominator = dij**2.0 SS = numerator/denominator totalSS += SS outf.write('%12s %12.5f %12.5f %12.5f\n' % (rowname[i], pij, dij, SS)) outf.write('total SS = %.5f\n' % totalSS) outf.close()