Functional Programming -- Lab Assignment 3 | TDA452 & DIT142 | LP2 | HT2011 | [Home] |
Some notes:
Good luck!
Lab Assignment 3 -- Sudoku
In this Lab Assignment, you will design a Haskell program that will be able to solve Sudokus, a popular logical puzzle originating from Japan.
Assignments and Deadlines
There are 6 regular assignments as part of this Lab: A, B, C, D, E, and F. The lab consists (again) of two parts.
For submission, assignments A, B, C and D are called Lab 3A.
Assignments E and F are called Lab 3B.
Deadlines for each of these parts are given on the home page. There are also extra assignments. You can choose freely whether to do one of these. Those are just for fun.
Hints
Some assignments have hints. Often, these involve particular standard Haskell functions that you could use. Some of these functions are defined in modules that you have to import yourself explicitly. You can use the following resources to find more information about those functions:
We encourage you to actually go and find information about the functions that are mentioned in the hints!Sudoku is a logic puzzle originating in Japan. In the West it has caught on in popularity enormously over the last five years or so. Most newspapers now publish a daily Sudoku puzzle for the readers to solve.
A Sudoku puzzle consists of a 9x9 grid. Some of the cells in the grid have digits (from 1 to 9), others are blank. The objective of the puzzle is to fill in the blank cells with digits from 1 to 9, in such a way that every row, every column and every 3x3 block has exactly one occurrence of each digit 1 to 9.
Here is an example of a Sudoku puzzle:
And here is the solution:
In this lab assignment, you will write a Haskell program that can read in a Sudoku puzzle and solve it.
More Information
If you want to read more about Sudokus, here are a few links:
To implement a Sudoku-solving program, we need to come up with a way of modelling Sudokus. A Sudoku is a matrix of digits or blanks. The natural way of modelling a matrix is as a list of lists. The outer list represents all the rows, and the elements of the list are the elements of each row. Digits or blanks can be represented by using the Haskell Maybe type. Digits are simply represented by Int.
Summing up, a natural way to represent Sudokus is using the following Haskell datatype:
data Sudoku = Sudoku [[Maybe Int]]Since it is convenient to have a function that extracts the actual rows from the Sudoku, we actually use the following equivalent datatype definition:
data Sudoku = Sudoku { rows :: [[Maybe Int]] }For example, the above Sudoku puzzle has the following representation in Haskell:
example :: Sudoku example = Sudoku [ [Just 3, Just 6, Nothing,Nothing,Just 7, Just 1, Just 2, Nothing,Nothing] , [Nothing,Just 5, Nothing,Nothing,Nothing,Nothing,Just 1, Just 8, Nothing] , [Nothing,Nothing,Just 9, Just 2, Nothing,Just 4, Just 7, Nothing,Nothing] , [Nothing,Nothing,Nothing,Nothing,Just 1, Just 3, Nothing,Just 2, Just 8] , [Just 4, Nothing,Nothing,Just 5, Nothing,Just 2, Nothing,Nothing,Just 9] , [Just 2, Just 7, Nothing,Just 4, Just 6, Nothing,Nothing,Nothing,Nothing] , [Nothing,Nothing,Just 5, Just 3, Nothing,Just 8, Just 9, Nothing,Nothing] , [Nothing,Just 8, Just 3, Nothing,Nothing,Nothing,Nothing,Just 6, Nothing] , [Nothing,Nothing,Just 7, Just 6, Just 9, Nothing,Nothing,Just 4, Just 3] ]Now, a number of assignments follows, which will lead you step-by-step towards an implementation of a Sudoku-solver.
To warm up, we start with a number of basic functions on Sudukos.
Assignment A
A1. Implement a function
allBlankSudoku :: Sudokuthat represents a Sudoku that only contains blank cells (this means that no digits are present). Do not use copy-and-paste programming here! Your definition does not need to be longer than a few short lines. |
A2. The Sudoku type we have defined allows for more things than Sudokus.
For example, there is nothing in the type definition that says that a
Sudoku has 9 rows and 9 columns,
or that digits need to lie between 1 and 9. Implement a function
isSudoku :: Sudoku -> Boolthat checks if all such extra conditions are met by the given Sudoku. Examples: Sudoku> isSudoku (Sudoku []) False Sudoku> isSudoku allBlankSudoku True Sudoku> isSudoku example True Sudoku> isSudoku (Sudoku (tail (rows example))) False |
A3. Our job is to solve Sudokus. So, it would be handy to know
when a Sudoku is solved or not. We say that a Sudoku is solved if there
are no blank cells left to be filled in anymore. Implement the following
function:
isSolved :: Sudoku -> BoolNote that we do not check here if the Sudoku is a valid solution; we will do this later. This means that any Sudoku without blanks (even Sudokus with the same digit appearing twice in a row) is considered solved by this function! |
Hints
To implement the above, use list comprehensions! Also, the following standard Haskell functions might come in handy:
replicate :: Int -> a -> [a] length :: [a] -> Int and :: [Bool] -> BoolTo help you get started, here is a file that you can use:
Next, we need to have a way of representing Sudokus in a file. In that way, our program can read Sudokus from a file, and it is easy for us to create and store several Sudoku puzzles.
The following is an example text-representation that we will use in this assignment. It actually represents the example above.
36..712.. .5....18. ..92.47.. ....13.28 4..5.2..9 27.46.... ..53.89.. .83....6. ..769..43There are 9 lines of text in this representation, each corresponding to a row. Each line contains 9 characters. A digit 1 -- 9 represents a filled cell, and a period (.) represents a blank cell.
Assignment B
B1. Implement a function:
printSudoku :: Sudoku -> IO ()that, given a Sudoku, creates instructions to print the Sudoku on the screen, using the format shown above. Example: Sudoku> printSudoku allBlankSudoku ......... ......... ......... ......... ......... ......... ......... ......... ......... Sudoku> printSudoku example 36..712.. .5....18. ..92.47.. ....13.28 4..5.2..9 27.46.... ..53.89.. .83....6. ..769..43 |
B2. Implement a function:
readSudoku :: FilePath -> IO Sudokuthat, given a filename, creates instructions that read the Sudoku from the file, and deliver it as the result of the instructions. You may decide yourself what to do when the file does not contain a representation of a Sudoku. Examples: Sudoku> do sud <- readSudoku "example.sud"; printSudoku sud 36..712.. .5....18. ..92.47.. ....13.28 4..5.2..9 27.46.... ..53.89.. .83....6. ..769..43 Sudoku> readSudoku "Sudoku.hs" Program error: Not a Sudoku! |
Hints
To implement the above, you will need to be able to convert between characters (type Char) and digits/integers (type Int). The standard functions chr and ord (import the module Data.Char) will come in handy here. Think about the following problems:
The constant value ord '0' will play a central role in all this.Here are some functions that might come in handy:
chr :: Int -> Char ord :: Char -> Int putStr :: String -> IO () putStrLn :: String -> IO () sequence_ :: [IO a] -> IO () readFile :: FilePath -> IO String lines :: String -> [String]Here are some example Sudoku-files that you can download and use:
Finally, we need to be able to test properties about the functions related to our Sudokus. In order to do so, QuickCheck needs to be able to generate arbitrary Sudokus.
Let us split this problem into a number of smaller problems. First, we need to know how to generate arbitrary cell values (of type Maybe Int). Then, we need to know how to generate 81 such cells, and compose them all into a Sudoku.
Assignment C
C1. Implement a function:
cell :: Gen (Maybe Int)that, contains instructions for generating a Sudoku cell. You have to think about the following: Example: Sudoku> sample cell Just 3 Nothing Nothing Just 7 Nothing |
C2. Make Sudokus an instance of the class Arbitrary.
instance Arbitrary Sudoku where ...We have already done this for you in the file Sudoku.hs. |
C3. Define a property
prop_Sudoku :: Sudoku -> Boolthat expresses that each generated Sudoku actually is a Sudoku according to Assignment A2. Also use QuickCheck to check that the property actually holds for all Sudokus that are generated. |
Hints
Here are some functions that might come in handy:
sample :: Show a => Gen a -> IO () choose :: Random a => (a,a) -> Gen a frequency :: [(Int,Gen a)] -> Gen a sequence :: [Gen a] -> Gen [a]You might want to take a look at the lecture notes and example code on test data generation.
Now, we are going to think about what actually constitutes a valid solution of a Sudoku. There are three constraints that a valid solution has to forfill:
This leads us to the definition of a block; a block is either a row or a column or a 3x3 block. A block therefore contains 9 cells:type Block = [Maybe Int]We are going to define a function that checks if a Sudoku is not violating any of the above constraints, by checking that none of the blocks violate those constraints.
Assignment D
D1. Implement a function:
isOkayBlock :: Block -> Boolthat, given a block, checks if that block does not contain the same digit twice. Examples: Sudoku> isOkayBlock [Just 1, Just 7, Nothing, Nothing, Just 3, Nothing, Nothing, Nothing, Just 2] True Sudoku> isOkayBlock [Just 1, Just 7, Nothing, Just 7, Just 3, Nothing, Nothing, Nothing, Just 2] False |
D2. Implement a function:
blocks :: Sudoku -> [Block]that, given a Sudoku, creates a list of all blocks of that Sudoku. This means: Also add a property that states that, for each Sudoku, there are 3*9 blocks, and each block has exactly 9 cells. |
D3. Now, implement a function:
isOkay :: Sudoku -> Boolthat, given a Soduko, checks that all rows, colums and 3x3 blocks do not contain the same digit twice. Examples: Sudoku> isOkay allBlankSudoku True Sudoku> do sud <- readSudoku "example.sud"; print (isOkay sud) True |
Hints
Here are some functions that might come in handy:
nub :: Eq a => [a] -> [a] transpose :: [[a]] -> [[a]] take :: Int -> [a] -> [a] drop :: Int -> [a] -> [a]Note that some of the above functions only appear when you import Data.List.
You might want to take a look at the exercises and answers on lists and list comprehensions.
We are getting closer to the final solving function. Let us start thinking about how such a function would work.
Given a Sudoku, if there are no blanks left in the Sudoku, we are done. Otherwise, there is at least one blank cell that needs to be filled in somehow. We are going to write functions to find and manipulate blank cells.
It is quite natural to start to talk about positions. A position is a coordinate that identifies a cell in the Sudoku. Here is a way of modelling coordinates:
type Pos = (Int,Int)We use positions as indicating first the row and then the column. For example, the position (3,5) denotes the 5th cell in the 3rd row.
Note: It is common in programming languages to start counting at 0! Therefore, the position that indicates the upper left corner is (0,0), and the position indicating the lower right corner is (8,8).
Assignment E
E1. Implement a function:
blanks :: Sudoku -> [Pos]that, given a Sudoku returns a list of the positions in the Sudoku that are still blank. You may decide on the order in which the positions appear. Examples: Sudoku> length (blanks allBlankSudoku) == 9*9 True Sudoku> blanks example [(0,2),(0,3),(0,7),(0,8),(1,0),(1,2),(1,3),(1,4),(1,5),(1,8),(2,0),(2,1), (2,4),(2,7),(2,8),(3,0),(3,1),(3,2),(3,3),(3,6),(4,1),(4,2),(4,4),(4,6), (4,7),(5,2),(5,5),(5,6),(5,7),(5,8),(6,0),(6,1),(6,4),(6,7),(6,8),(7,0), (7,3),(7,4),(7,5),(7,6),(7,8),(8,0),(8,1),(8,5),(8,6)]In addition, write a property that states that all cells in the blanks list are actually blank. |
E2. Implement a function:
(!!=) :: [a] -> (Int,a) -> [a]that, given a list, and a tuple containing an index in the list and a new value, updates the given list with the new value at the given index. Examples: Sudoku> ["a","b","c","d"] !!= (1,"apa") ["a","apa","c","d"] Sudoku> ["p","qq","rrr"] !!= (0,"bepa") ["bepa","qq","rrr"]Also write (a) propert(y/ies) that state(s) the expected properties of this function. Think about what can go wrong! |
E3. Implement a function:
update :: Sudoku -> Pos -> Maybe Int -> Sudokuthat, given a Sudoku, a position, and a new cell value, updates the given Sudoku at the given position with the new value. Example: Sudoku> printSudoku (update allBlankSudoku (1,3) (Just 5)) ......... ...5..... ......... ......... ......... ......... ......... ......... .........Also write a property that checks that the updated position really has gotten the new value. |
E4. Implement a function:
candidates :: Sudoku -> Pos -> [Int]that, given a Sudoku, and a blank position, determines which numbers could be legally written into that position. Example: Sudoku> candidates example (0,2) [4,8] Sudoku> candidates allBlankSudoku (8,8) [1,2,3,4,5,6,7,8,9]In addition, write a property that relates the function candidates with the functions update, isSudoku, and isOkay. (This property can be very useful to understand how to solve Sudokus!) |
Hints
There is a standard function (!!) in Haskell for getting a specific element from a list. It starts indexing at 0, so for example to get the first element from a list xs, you can use xs !! 0.
We usually use the standard function zip to pair up elements in a list with their corresponding index. Example:
Prelude> ["apa","bepa","cepa"] `zip` [1..3] [("apa",1),("bepa",2),("cepa",3)]This, in combination with list comprehensions, should be very useful for this assignment!
When testing a property that is polymorphic (meaning that it has type variables in its type), you need to add a type signature that picks an arbitrary type. For example, when testing properties for the function (!!=), which works for lists of any type, you have to fix the type when testing, for example lists of Integers. Do this by adding a type signature to your properties.
Here are some more useful functions:
head :: [a] -> a (!!) :: [a] -> Int -> a zip :: [a] -> [b] -> [(a,b)]
Finally, we have all the bits in place to attack our main problem: Solving a given Sudoku.
Our objective is to define a Haskell function
solve :: Sudoku -> Maybe SudokuThe basic idea is as follows. Function solve must first check that its argument is not already a bad Sudoku. This means that (1) it represents a 9x9 sudoku, (2) it has no blocks (rows, columns, 3x3 blocks) that contain the same digit twice. We will only do this check once. If the argument is bad then solve must return Nothing
Now if we have such a Sudoku sud that we would like to solve, we give it to a recursive helper function solve'.
The solve' function must consider all the blanks in sud. If this list is empty then by (1) and (2) above we are done, and the answer of solve' (and hence solve) must be Just sud.
Otherwise there is at least one blank position. We choose one of them. For this blank position we we try to recursively solve sud, once for each possible candidate; in each recursive case we update the blank cell with a candidate. The first recursive attempt that does not give Nothing provides our solution. But if none of the recursive attempts succeed, we return Nothing. This method of problem solving is called backtracking.
Assignment F
F1. Implement a function:
solve :: Sudoku -> Maybe Sudokuusing the above idea. Examples: Sudoku> printSudoku (fromJust (solve allBlankSudoku)) 123456789 456789123 789123456 214365897 365897214 897214365 531642978 642978531 978531642 Sudoku> do sud <- readSudoku "example.sud"; printSudoku (fromJust (solve sud)) 364871295 752936184 819254736 596713428 431582679 278469351 645328917 983147562 127695843 Sudoku> do sud <- readSudoku "impossible.sud"; print (solve sud) Nothing(In the above examples, we use the standard function fromJust from the library Data.Maybe.) |
F2. For your own convenience, define a function:
readAndSolve :: FilePath -> IO ()that produces instructions for reading the Sudoku from the given file, solving it, and printing the answer. Examples: Sudoku> readAndSolve "example.sud" 364871295 752936184 819254736 596713428 431582679 278469351 645328917 983147562 127695843 Sudoku> readAndSolve "impossible.sud" (no solution) |
F3. Implement a function:
isSolutionOf :: Sudoku -> Sudoku -> Boolthat checks, given two Sudokus, whether the first one is a solution (i.e. all blocks are okay, there are no blanks), and also whether the first one is a solution of the second one (i.e. all digits in the second sudoku are maintained in the first one). Examples: Sudoku> fromJust (solve allBlanksSudoku) `isSolutionOf` allBlanksSudoku True Sudoku> allBlankSudoku `isSolutionOf` allBlanksSudoku False Sudoku> fromJust (solve allBlankSudoku) `isSolutionOf` example False |
F4. Define a property:
prop_SolveSound :: Sudoku -> Propertythat says that the function solve is sound. Soundness means that every supposed solution produced by solve actually is a valid solution of the original problem. |
Hints
All the work we did in the assignments A -- E should be used in order to implement the function solve.
QuickChecking the property prop_SolveSound will probably take a long time. Be patient! Alternatively, there are a number of things you can do about this.
It is okay if you do not find a completely satisfactory solution to this issue.Here are some useful functions:
fromJust :: Maybe a -> a listToMaybe :: [a] -> Maybe a catMaybes :: [Maybe a] -> [a]
Here is an example of an impossible Sudoku:
Just for fun. You can choose freely whether to do 0, 1 or more of these. Don't expect us to spend time grading these however. There are no perfect, pre-defined answers here.
Submit your solutions using the Fire system.
Your submission should consist of the following file:
Before you submit your code, Clean It Up! Remember, submitting clean code is Really Important, and simply the polite thing to do. After you feel you are done, spend some time on cleaning your code; make it simpler, remove unneccessary things, etc. We will reject your solution if it is not clean. Clean code:To the Fire System Good Luck!
Lab written and developed by Koen Lindström Claessen |