8

I am trying to generate all possible keypad sequences (7 digit length only right now). For example if the mobile keypad looks like this:

1 2 3
4 5 6
7 8 9
  0

Some of the possible sequences can be:

123698
147896
125698
789632

The requirement is that the each digit of number should be neighbor of previous digit.

Here is how I am planning to start this:

The information about the neighbor changes from keypad to keypad so we have to hardcode it like this:

neighbors = {0: 8, 1: [2,4], 2: [1,3,5], 3: [2,6], 4: [1,5,7], 5: [2,4,6,8], 6: [3,5,9], 7: [4,8], 8: [7,5,9,0], 9: [6,8]}

I will be traversing through all digits and will append one of the possible neighbors to it until required length is achieved.

EDIT: Updated neighbors, no diagonals allowed EDIT 2: Digits can be reused

6
  • 1
    So, what's your question? You seem to understand the problem and you've made a start on the solution. What do you need help with? As a possible hint, note that all the 7-digit sequences can be found by caculating all the 6-digit sequences then adding all possible next moves to each of those. All the 6 digit sequences can be foudn by calculating all the 5-digit sequences... Nov 22, 2010 at 21:25
  • 1
    You are being very inconsistent with your neighbors. You show that 0 only has 1 neighbor, while 1 has 3. Do you count diagonals or not? If so, 2 should have 5 neighbors, if not, 1 should only have 2 neighbors, etc.
    – Jeff B
    Nov 22, 2010 at 21:26
  • Similar to stackoverflow.com/questions/2893470/…, except neighbors are defined differently. Nov 22, 2010 at 21:29
  • Thanks for the correction Jeff B, not counting diagonals. Changed!
    – Irfan
    Nov 22, 2010 at 22:14
  • Can numbers be used more than once in a given sequence, or is this like Boggle where each can only be used once? Nov 22, 2010 at 22:29

6 Answers 6

3

Try this.

 neighbors = {0: [8], 
             1: [2,4], 
             2: [1,4,3], 
             3: [2,6], 
             4: [1,5,7], 
             5: [2,4,6,8], 
             6: [3,5,9], 
             7: [4,8], 
             8: [7,5,9,0], 
             9: [6,8]}


def get_sequences(n):
    if not n:
        return
    stack = [(i,) for i in  range(10)]
    while stack:
        cur = stack.pop()
        if len(cur) == n:
            yield cur
        else:
            stack.extend(cur + (d, ) for d in neighbors[cur[-1]]) 

print list(get_sequences(3))

This will produce all possible sequences. You didn't mention if you wanted ones that have cycles in them, for example (0, 8, 9, 8) so I left them in. If you don't want them, then just use

 stack.extend(cur + (d, ) 
              for d in neighbors[cur[-1]]
              if d not in cur)

Note that I made the entry for 0 a list with one element instead of just an integer. This is for consistency. It's very nice be able to index into the dictionary and know that you're going to get a list back.

Also note that this isn't recursive. Recursive functions are great in languages that properly support them. In Python, you should almost always manage a stack like I demonstrate here. It's just as easy as a recursive solution and sidesteps function call overhead (python doesn't support tail recursion) and maximum recursion depth concerns.

0
1
neighbors = {0: [8], 1: [2,5,4], 2: [1,4,3], 3: [2,5,6], 4: [1,5,7], 5: [2,4,6,8], 6: [3,5,9], 7: [4,5,8], 8: [7,5,9,0], 9: [6,5,8]}

def gen_neighbor_permutations(n, current_prefix, available_digit_set, removed_digits=set(), unique_digits=False):
    if n == 0:
            print current_prefix
            return
    for d in available_digit_set:
            if unique_digits:
                    gen_neighbor_permutations(n-1, current_prefix + str(d), set(neighbors[d]).difference(removed_digits), removed_digits.union(set([d])), unique_digits=True )
            else:
                    gen_neighbor_permutations(n-1, current_prefix + str(d), set(neighbors[d]).difference(removed_digits) )

gen_neighbor_permutations(n=3, current_prefix='', available_digit_set=start_set)

I also couldn't help but notice that in your examples, none of the digits are reused. If you want that, then you would use the unique_digits = True option; this will disallow recursion on digits that are already used.

+1 What a fun puzzle. I hope this works for you!

gen_neighbor_permutations(n=3, current_prefix='', available_digit_set=start_set, unique_digits = True)
1

Recursion isn't really much of an issue here because the sequence is relatively short as are the choices for each digit except the first -- so there appear to "only" be 4790 possibilities disallowing diagonals. This is written as an iterator to eliminate the need to create and return a large container with all possibilities produced in it.

It occurred to me that an additional benefit of the data-driven approach of storing the neighbor adjacency information in a data structure (as the OP suggested) was that besides easily supporting different keypads, it also makes controlling whether diagonals are allowed or not trivial.

I debated briefly about whether to make it a list instead of a dictionary for faster lookups, but realized that doing so would make it more difficult to adapt to produce sequences other than digits (and likely wouldn't make it significantly faster anyway).

adjacent = {1: [2,4],   2: [1,3,4],   3: [2,6],
            4: [1,5,7], 5: [2,4,6,8], 6: [3,5,9],
            7: [4,8],   8: [0,5,7,9], 9: [6,8],
                        0: [8]}

def adj_sequences(ndigits):
    seq = [None]*ndigits  # pre-allocate

    def next_level(i):
        for neighbor in adjacent[seq[i-1]]:
            seq[i] = neighbor
            if i == ndigits-1:  # last digit?
                yield seq
            else:
                for digits in next_level(i+1):
                    yield digits

    for first_digit in range(10):
        seq[0] = first_digit
        for digits in next_level(1):
            yield digits

cnt = 1
for digits in adj_sequences(7):
    print '{:d}: {!r}'.format(cnt, ''.join(map(str,digits)))
    cnt += 1
1
  • This is probably a better solution to the problem than mine. Nov 23, 2010 at 6:45
0

That's a classic recursive algorithm. Some pseudo code to show the concept:

function(numbers) { 
  if (length(numbers)==7) { 
    print numbers; 
    return; 
  } 
  if (numbers[last]=='1') { 
    function(concat(numbers,  '2')); 
    function(concat(numbers,  '4')); 
    return; 
  } 
  if (numbers[last]==='2') { 
    function(concat(numbers,  '1')); 
    function(concat(numbers,  '3')); 
    function(concat(numbers,  '5')); 
    return; 
  } 
  ...keep going with a condition for each digit..
} 
4
  • 1
    Is this how people actually program in non dynamic languages? Why not just use a hash table into lists of neighboring digits like OP suggested? You don't even need first class functions for that. Nov 22, 2010 at 21:56
  • @aaron, some people just program like that. It doesn't matter if the language is dynamic or not. eg, your own answer here doesn't use any dynamic features. Nov 22, 2010 at 22:43
  • This solution is really tightly coupled to the keypad layout, especially since the OP mentioned that "The information about the neighbor changes from keypad to keypad" Not going to -1 since it's not strictly wrong, but it's not very reusable for other key layouts.
    – Davy8
    Nov 22, 2010 at 22:47
  • It's psuedo code. The purpose is to show the algorithm in an easily readable format and not how you actually implement it.
    – JOTN
    Nov 22, 2010 at 22:58
0
neighbors = {0: [8], 1: [2,5,4], 2: [1,4,3], 3: [2,5,6], 4: [1,5,7], 5: [2,4,6,8], 6: [3,5,9], 7: [4,5,8], 8: [7,5,9,0], 9: [6,5,8]}

def keyNeighborsRec(x, length):
    if length == 0:
            print x
            return
    for i in neighbors[x%10]:
            keyNeighborsRec(x*10+i,length-1)


def keyNeighbors(l):
    for i in range(10):
            keyNeighborsRec(i,length-1)

keyNeighbors(7)

its really easy without the neighbor condition...

def keypadSequences(length):
    return map(lambda x: '0'*(length-len(repr(x)))+repr(x), range(10**length))

keypadSequences(7)
2
  • That's just printing all the possible number sequences. There's some rules in the problem about what the next number in the sequence can be.
    – JOTN
    Nov 22, 2010 at 21:45
  • yes, read my above comment. i noticed the neighbors thing afterwords. this would be the answer without neighbor conditions Nov 22, 2010 at 21:46
0
states = [
    [8],
    [2, 4],
    [1, 3, 5],
    [2, 6],
    [1, 5, 7],
    [2, 4, 6, 8],
    [3, 5, 9],
    [4, 8],
    [5, 7, 9, 0],
    [6, 8]
]

def traverse(distance_left, last_state):
    if not distance_left:
        yield []
    else:
        distance_left -= 1
        for s in states[last_state]:
            for n in traverse(distance_left, s):
                yield [s] + n

def produce_all_series():
    return [t for i in range(10) for t in traverse(7, i)]

from pprint import pprint
pprint(produce_all_series())

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