Background

Most of the material here is covered in the Gnu Octave Beginner's Guide, in particular

GOBG Chapter 2
GOBG Chapter 4
GOBG Chapter 5

For some parts, we will refer to the GNU Octave Manual

We'll refer to the online text by Robert Beezer for linear algebra background. We can happily ignore the stuff about complex numbers.

Before the lab

One of the main features of Octave we will discuss is vectorization. To understand it, we need some background material on Linear Algebra. If you've taken a linear algebra course recently, this should be easy, otherwise you will probably need to review

Vector Operations, particularly
- Addition
- Subtraction
- Scalar multiplication
Inner product
Matrix Operations
- Addition
- Subtraction
- Scalar multiplication
Matrix Vector Product
Matrix Multiplication

If you don't have time before this lab, make sure you review any needed linear algebra before the next lab.

Running Octave

There is a GUI accessible from Activities -> GNU Octave, or by running from the command line
```
  % octave --gui
```
There is also a REPL accessible from the command line by running
```
  %  octave
```
To sanity check your octave setup, run the following plots
```
  >> surf(peaks)
  >> countourf(peaks)
```

Fibonacci

Time: 15 minutes
Activity: Demo/Group programming.

Let's dive in to programming in Octave with a straight-forward port of our Python Fibonacci function. Save the following in ~/fcshome/cs2613/labs/L19/fib.m. It turns out to be important that the function name is the same as the file name.

function ret = fib(n)
  a = 0;
  b = 1;
  for i=0:n



  endfor
endfunction

%!assert (fib(0) == 0);
%!assert (fib(1) == 1);
%!assert (fib(2) == 1);
%!assert (fib(3) == 2);
%!assert (fib(4) == 3);
%!assert (fib(5) == 5);

We can avoid the need for a temporary variable by calling deal function, but it's not clear that would be faster. If you have time, try it.
Note the %! assert. These are unit tests that can be run with
```
  >> test fib
```
The syntax for %!assert is a bit fussy, in particular the parentheses are needed around the logical test.

Fibonaccci as matrix multiplication

Time: 20 minutes
Activity: individual

The following is a well known identity about the Fibonacci numbers F(i).

[ 1, 1;
  1, 0 ]^n = [ F(n+1), F(n);
               F(n),   F(n-1) ]

Since matrix exponentiation is built-in to octave, this is particularly easy to implement in octave

Save the following as ~/fcshome/cs2613/labs/L19/fibmat.m, fill in the two matrix operations needed to complete the algorithm

function ret = fibmat(n)
  A = [1,1; 1,0];


endfunction

%!assert (fibmat(0) == 0);
%!assert (fibmat(1) == 1);
%!assert (fibmat(2) == 1);
%!assert (fibmat(3) == 2);
%!assert (fibmat(4) == 3);
%!assert (fibmat(5) == 5);
%!assert (fibmat(6) == 8);
%!assert (fibmat(25) == 75025);

Performance comparison

Time: 10 minutes
Activity: Demo / discussion

We can expect the second Fibonacci implementation to be faster for two distinct reasons

It's possible to compute matrix powers rather quickly (O(log n) compared O(n)), and since the fast algorithm is also simple, we can hope that octave implements it. Since the source to octave is available, we could actually check this.
Octave is interpreted, so loops are generally slower than matrix operations (which can be done in a single call to an optimized library). This general strategy is called vectorization, and applies in a variety of languages, usually for numerical computations. In particular most PC hardware supports some kind of hardware vector facility.

Of course, the first rule of performance tuning is to carefully test any proposed improvement. The following code gives an extensible way to run simple timing tests, in a manner analogous to the Python timeit method, whose name it borrows.

# Based on an example from the Julia microbenchmark suite.

function timeit(func, argument, reps)
    times = zeros(reps, 1);

    for i=1:reps
      tic(); func(argument); times(i) = toc();
    end

    times = sort(times);
    fprintf ('%s\tmedian=%.3fms mean=%.3fms total=%.3fms\n',func2str(func), median(times)*1000,
             mean(times)*1000, sum(times)*1000);
endfunction

What are the new features of octave used in this sample code?

tic, toc, from GOBG8, GO 36.1
Function Handles
what else?

We can either use timeit from the octave command line, or build a little utility function like

function bench
  timeit(@fib, 42, 100000)
  timeit(@fibmat, 42, 100000)
endfunction

Python Quiz

Questions and unit tests will be distributed via email and teams at or before 9:30.