This code runs two different Markov decision processes and one Q-learning analysis of various grid world problems for assignment 4 of CS-7641 at Georgia Tech.
The code for this assignment is available from this Github repo: https://github.com/stormont/cs7641-assignment-4
This code was based upon another public Github repo, available here: https://github.com/juanjose49/omscs-cs7641-machine-learning-assignment-4
To run, load the project in Eclipse. Under the ./src/burlap/assignment4/ directory, find a number of files named XxxLauncher.java. Each of these are the main entry point to run a different grid problem:
- EasyGridWorldLauncher.java: Runs an analysis of a simple 5x5 grid problem with one terminal state and no obstructions.
- HardGridWorldLauncher_NxN.java: Various sizes of a harder grid problem with an square obstruction in the middle of the grid. Inside the square is empty, but inescapable. The N in the name refers to a subregion size; much like Sudoku has 9 regions of 3x3 size, this grid world has 9 regions of NxN size.
Each problem (1 "easy" and 6 "hard" grids) will run 1000 iterations of value iteration, policy iteration, and Q-learning analysis, and will generate a heat-mapped image of the results (along with console output). The larger the grid size, the longer the code will take to run.
Additional analysis was done using different Q-learning policies for comparison. These can be found commented out starting on line 154 of ./src/burlap/assignment4/util/AnalysisRunner.java. By default, an EpsilonGreedy policy is used with an epsilon value of 0.1.
(Original README follows)
#OMSCS: Machine Learning - Assignment 4
Greetings! The purpose of this readme file is to offer the reader the steps required to make use of this BURLAP machine learning package with several of my own custom classes (included) and Eclipse (not included). This readme is split by the different Markov Decision Processes that were required for completion of the assignment. The instructions below will assume that you have already successfully downloaded and opened Eclipse.
##Running the Grid World: Low Difficulty Analysis:
- While inside the directory structure burlap-assignment-4/src/burlap/assignment4/ right-click on the EasyGridWorldLauncher.
- Go to the “Run As…” section and select “Java Application.
- All three algorithms will run and the aggregate analysis and optimal policies will be printed to the console.
##Running the Grid World: High Difficulty Analysis:
- While inside the directory structure burlap-assignment-4/src/burlap/assignment4/ right-click on the HardGridWorldLauncher.
- Go to the “Run As…” section and select “Java Application.
- All three algorithms will run and the aggregate analysis and optimal policies will be printed to the console.
##Sample Output This is the sort of output you get out of the box by running the HardGridWorldLauncher as a Java Application:
/////Hard Grid World Analysis/////
This is your grid world:
[0,0,0,0,0,0,0,0,0,0,0]
[0,0,0,0,0,0,0,0,0,0,0]
[0,0,0,0,0,0,0,0,0,0,0]
[0,0,0,1,1,1,1,1,0,0,0]
[0,0,0,1,0,0,0,1,0,0,0]
[0,0,0,1,0,0,0,1,0,0,0]
[0,0,0,1,0,0,0,1,0,0,0]
[0,0,0,1,1,1,1,1,0,0,0]
[0,0,0,0,0,0,0,0,0,0,0]
[0,0,0,0,0,0,0,0,0,0,0]
[0,0,0,0,0,0,0,0,0,0,1]
//Value Iteration Analysis//
Passes: 1
...
Passes: 20
Value Iteration,3752,2228,1150,49,33,31,29,36,31,28,39,29,25,30,28,26,23,23,44,31
This is your optimal policy:
num of rows in policy is 11
[>,>,>,>,>,>,>,>,>,>,>]
[>,>,>,>,>,>,>,>,>,>,^]
[>,>,>,>,>,>,>,>,^,^,^]
[^,^,^,*,*,*,*,*,^,^,^]
[^,^,^,*,*,*,*,*,^,^,^]
[^,^,^,*,*,*,*,*,^,^,^]
[^,^,^,*,*,*,*,*,^,^,^]
[^,^,^,*,*,*,*,*,^,^,^]
[^,^,^,>,>,>,>,>,^,^,^]
[^,^,>,>,>,>,>,>,^,^,^]
[^,>,>,>,>,>,>,>,^,^,*]
Num generated: 1500; num unique: 95
//Policy Iteration Analysis//
Total policy iterations: 1
...
Total policy iterations: 20
Policy Iteration,11375,8124,1514,626,2549,528,214,46,23,25,30,25,21,28,25,23,26,25,25,24
Passes: 19
This is your optimal policy:
num of rows in policy is 11
[>,>,>,>,>,>,>,>,>,>,v]
[>,>,>,>,>,>,>,>,>,^,^]
[>,>,>,>,>,>,>,>,^,^,^]
[^,^,^,*,*,*,*,*,^,^,^]
[^,^,^,*,*,*,*,*,^,^,^]
[^,^,^,*,*,*,*,*,^,^,^]
[^,^,^,*,*,*,*,*,^,^,^]
[^,^,^,*,*,*,*,*,^,^,^]
[^,^,^,>,>,>,>,>,^,^,^]
[^,^,>,>,>,>,>,>,^,^,^]
[^,^,>,>,>,>,>,>,^,^,*]
//Q Learning Analysis//
Q Learning,301,571,191,194,150,302,129,64,137,364,113,114,69,141,155,58,108,89,71,78
Passes: 19
This is your optimal policy:
num of rows in policy is 11
[>,>,^,>,>,>,v,>,^,>,>]
[^,^,>,>,v,>,>,^,>,^,^]
[>,<,>,>,>,^,>,>,>,^,v]
[^,^,^,*,*,*,*,*,^,v,^]
[<,^,<,*,*,*,*,*,v,^,v]
[^,>,<,*,*,*,*,*,>,^,^]
[<,v,^,*,*,*,*,*,^,<,^]
[<,>,<,*,*,*,*,*,>,v,^]
[^,>,>,>,<,>,>,>,^,>,>]
[>,>,^,^,>,v,^,^,>,^,^]
[^,^,v,v,>,>,<,v,<,v,*]
//Aggregate Analysis//
The data below shows the number of steps/actions the agent required to reach
the terminal state given the number of iterations the algorithm was run.
Iterations,1,2,3,4,5,6,7,8,9,10,11,12,13,14,15,16,17,18,19,20
Value Iteration,3752,2228,1150,49,33,31,29,36,31,28,39,29,25,30,28,26,23,23,44,31
Policy Iteration,11375,8124,1514,626,2549,528,214,46,23,25,30,25,21,28,25,23,26,25,25,24
Q Learning,301,571,191,194,150,302,129,64,137,364,113,114,69,141,155,58,108,89,71,78
The data below shows the number of milliseconds the algorithm required to generate
the optimal policy given the number of iterations the algorithm was run.
Iterations,1,2,3,4,5,6,7,8,9,10,11,12,13,14,15,16,17,18,19,20
Value Iteration,224,36,39,44,32,53,67,104,81,86,88,135,121,208,149,100,86,115,102,106
Policy Iteration,18,32,20,51,26,32,39,50,65,51,97,107,111,90,64,80,71,82,162,164
Q Learning,37,50,34,76,29,73,52,44,65,60,28,45,32,23,53,36,34,29,40,40
The data below shows the total reward gained for
the optimal policy given the number of iterations the algorithm was run.
Iterations,1,2,3,4,5,6,7,8,9,10,11,12,13,14,15,16,17,18,19,20
Value Iteration Rewards,-3650.0,-2126.0,-1048.0,53.0,69.0,71.0,73.0,66.0,71.0,74.0,63.0,73.0,77.0,72.0,74.0,76.0,79.0,79.0,58.0,71.0
Policy Iteration Rewards,-11273.0,-8022.0,-1412.0,-524.0,-2447.0,-426.0,-112.0,56.0,79.0,77.0,72.0,77.0,81.0,74.0,77.0,79.0,76.0,77.0,77.0,78.0
Q Learning Rewards,-199.0,-469.0,-89.0,-92.0,-48.0,-200.0,-27.0,38.0,-35.0,-262.0,-11.0,-12.0,33.0,-39.0,-53.0,44.0,-6.0,13.0,31.0,24.0