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Theres a cute little game on Android called Traffic Jam

I've written a recursive solver:

import copy,sys

def lookup_car(car_string,ingrid):
  for row in ingrid:
    for cell in row:
      if cell == car_string:
  return car

#True if up/down False if side to side
def isDirectionUp(car):
  for node in car:
    if node[0] != init_row:
      return True
  return False   

def space_up(car,grid):
  m_space_up = (top_node[0]-1,top_node[1])
  if top_node[0] == 0:
    return -1
  elif grid[m_space_up[0]][m_space_up[1]] != " ":
    return -1
    return m_space_up

def space_down(car,grid):
  bottom_node = car[-1]
  m_space_down = (bottom_node[0]+1,bottom_node[1])
  if bottom_node[0] == 5 :
    return -1
  elif grid[m_space_down[0]][m_space_down[1]] != " ":
    return -1
    return m_space_down

def space_left(car,grid):
  left_node = car[0]
  m_space_left = (left_node[0],left_node[1]-1)
  if left_node[1] == 0 :
    return -1
  elif grid[m_space_left[0]][m_space_left[1]] != " ":
    return -1
    return m_space_left

def space_right(car,grid):
  right_node = car[-1]
  m_space_right = (right_node[0],right_node[1]+1)
  if right_node[1] == 5 :
    return -1
  elif grid[m_space_right[0]][m_space_right[1]] != " ":
    return -1
    return m_space_right

def list_moves(car,grid):
  ret =[]
  if isDirectionUp(car):
    up = space_up(car,grid) 
    if up != -1:
    down = space_down(car,grid)
    if down != -1:
    left = space_left(car,grid)
    if left != -1:
    right = space_right(car,grid)
    if right != -1:
  return ret

def move_car(car_string,move,ingrid):
  grid = copy.deepcopy(ingrid)
  car = lookup_car(car_string,grid)
  move_to = move[1]
  front = car[0]
  back = car[-1]
  if(move[0] == "UP" or move[0] == "LEFT"):
    grid[back[0]][back[1]] = " "
    grid[move_to[0]][move_to[1]] = car_string 
  elif(move[0] == "DOWN" or move[0] == "RIGHT"):
    grid[front[0]][front[1]] = " "
    grid[move_to[0]][move_to[1]] = car_string 
  return grid

def is_solution(grid):       
  car = lookup_car("z",grid)
  if(car[-1] == [2,5]):
    return True
  elif space_right(car,grid) == -1:
    return False
    solgrid = move_car("z",("RIGHT",space_right(car,grid)),grid)
    return is_solution(solgrid)

def print_grid(grid):
  for row in grid:
    print ''.join(row)

def solve(grid,solution,depth):
  global stop
  global state
  if grid in state:
  if stop:
  if is_solution(grid):
    print len(solution)
    for each in "abcdefzhijklm":
      car = lookup_car(each,grid)
      moves = list_moves(car,grid)
      for move in moves:
        moved_grid = move_car(each,move,grid)


#grid file using a-w  and x means free space, and ' ' means yellow car
grid=[list(x) for x in file(sys.argv[1]).read().split('\n')[0:-1]]

WHERE grid is in a file:


But, it takes over 8000 moves to find a solution ,and fails to find a simple 30 move solution. What is wrong with the algorithm?

share|improve this question
What stops it from going into cycles? –  Lou Franco Dec 8 '10 at 18:12
Also, consider the differences between en.wikipedia.org/wiki/Breadth-first_search and en.wikipedia.org/wiki/Depth-first_search and see what fits best for the problem. –  Martin Klinke Dec 8 '10 at 18:15
The problem is with your solve() function. What kind of search algorithm were you trying to implement? Assuming BFS, take a look at the wikipedia article on "Breadth-first search" and try to translate their pseudo-code into python more faithfully. –  jtdubs Dec 8 '10 at 18:15
Lou. What stops it from going into cycles is the global state var which keeps a history. And then stops the recursion if it has already encountered this state –  hunterp Dec 8 '10 at 18:17
Can I curse you for A: Making me download that game, and B: making me want to write a solver for it? One suggestion: Why not just use an actual space instead of x for empty spaces. It would make the structure much more human readable. –  Tyler Eaves Dec 8 '10 at 18:19

2 Answers 2

up vote 1 down vote accepted

If the branching factor of your search space is r then the number of vertices in the search tree to depth n is (1-r^n)/(1-r). A problem with a minimal 30 step solution, even in the simple case where r = 2, will have a search tree with around 2^30 - 1 ~= 1,000,000,000 vertices. Now, your branching factor is likely to be bigger than 2, so a 30 step problem is a long way from trivial!

That said, I'd be inclined to (a) find a better representation of your problem (searching arrays of strings is slow) and (b) consider best-first search where you guide your search with a heuristic (e.g., distance of the yellow car from its destination or the number of cars blocking the path of the yellow car).

Hope this helps.

share|improve this answer
Initialize a sequence Σ of sets, to contain a single set containing all vertices. Initialize the output sequence of vertices to be empty. While Σ is non-empty: Find and remove a vertex v from the first set in Σ If first set in Σ is now empty, remove it from Σ Add v to the end of the output sequence. For each edge v-w such that w still belongs to a set S in Σ: –  hunterp Dec 9 '10 at 5:52
If the set S containing w has not yet been replaced while processing v, create a new empty replacement set T and place it prior to S in the sequence; otherwise, let T be the set prior to S. Move w from S to T, and if this causes S to become empty remove S from the sequence. –  hunterp Dec 9 '10 at 5:54
Action Team, I leave the rest to you. –  hunterp Dec 9 '10 at 5:55
Lots of interested people. Anyone come up with their own solution yet? –  hunterp Dec 9 '10 at 22:22

This is essentially a (relatively token) searching problem, with a huge search space. As others recommended, read up on Depth-first search, and then read up on Breadth-first search, and when you learn the difference, read up on A* Search, and coming up with a pessimistic scoring function.

Also, note that in this case, you already know what the end state should be, thus, another approach would be to search from both ends and meet in the middle. This should reduce your search space considerably.

If that's still not enough, you can combine the techniques!

share|improve this answer
Cool Idea. Would love to see some code. –  hunterp Dec 9 '10 at 3:50

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