# Pythonic way of writing a sequence of integers in monotonically increasing order

What is the pythonic and efficient way of writing integers from 1 to 10**6 where digits are in a monotonically increasing order?

For example: (1,2,3,4,5,6,7,8,9,10,11,20,21,22,30,31,32,33,...)

This gets the job done but looks pretty ugly.

nums = [10**0*k6 for k6 in range(1,10)] +
[10**1*k5 + 10**0*k6 for k5 in range(1,10) for k6 in range(k5+1)] +
[10**2*k4 + 10**1*k5 + 10**0*k6
for k4 in range(1,10) for k5 in range(k4+1) for k6 in range(k5+1)] +
[10**3*k3 + 10**2*k4 + 10**1*k5 + 10**0*k6
for k3 in range(1,10) for k4 in range(k3+1) for k5 in range(k4+1) for k6 in range(k5+1)] +
[10**4*k2 + 10**3*k3 + 10**2*k4 + 10**1*k5 + 10**0*k6
for k2 in range(1,10) for k3 in range(k2+1) for k4 in range(k3+1) for k5 in range(k4+1) for k6 in range(k5+1)] +
[10**5*k1 + 10**4*k2 + 10**3*k3 + 10**2*k4 + 10**1*k5 + 10**0*k6
for k1 in range(1,10) for k2 in range(k1+1) for k3 in range(k2+1) for k4 in range(k3+1) for k5 in range(k4+1) for k6 in range(k5+1)]
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what do you mean non-decreasing order? –  HennyH May 2 '13 at 15:13
non-decreasing == ascending ? –  brbcoding May 2 '13 at 15:14
It's supposed to say non-increasing –  Tom May 2 '13 at 15:14
I think he means having a number (d1)(d2)(d3)... each digit (dn) must be greater than or equal to (dn-1) –  HennyH May 2 '13 at 15:15
Could you provide a concise example of input and expected output? –  dckrooney May 2 '13 at 15:27

This returns 8001 numbers for max_digits=6:

def ascending(ndig, first_digit_max):
for x in xrange(0, first_digit_max+1):
if ndig == 1:
yield [x]
else:
for y in ascending(ndig-1, x):
yield [x] + y

max_digits = 6
nums = sorted([int(''.join(map(str, num)))
for ndig in xrange(1, max_digits+1)
for num in ascending(ndig, 9)
if any(num)])

ascending yields lists of ndig digits, where the first digit is lower or equal to first_digit_max. It works recursively, so if it is called with ndig=6, it calls itself with ndig=5, etc. until it calls itself with ndig=1 where it returns just individual digits. These are lists, so they have to be checked if any of these digits is different to zero (otherwise it would return 0, 00, 000, etc. as well) and converted into numbers.

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I'd appreciate a quick overview of the logic behind this solution :) –  HennyH May 2 '13 at 15:53
Quite smart to use recursion for this. –  Thijs van Dien May 2 '13 at 16:06
def gen(size_digits):
if size_digits == 0:
return ( i  for i in range(10) )
else:
return ( new_dig*(10**size_digits) + old_digit  for old_digit in gen(size_digits-1) for new_dig in range(10) if  new_dig <  int(str(old_digit)[0])   )

l = [ num for num in gen(6) ]
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A few improvements: find the most-significant digit of old_digit with old_digit/10**(size_digits-1). Or alternatively, pass new_dig to your recursive call (in an optional argument, defaulting to 9) and make the range calls go to that arg+1 (then you don't need the if in the generator expression at all). –  Blckknght May 2 '13 at 16:28

Here's an (almost) one-liner:

from itertools import combinations_with_replacement
from string import digits

lst = sorted(set(int('0' + ''.join(reversed(e)))
for e in combinations_with_replacement([''] + list(digits), 6)))[1:]
print lst

How it works

digits is the string 0123456789 and combinations_with_replacement creates every combination of sorted digits that's possible. By adding the empty string, we get every sorted integer of size less or equal to 6.

Of course, we want the digits in reverse sorted orde, not sorted order, so that's why we reverse each result. But this puts the list out order, so we sort the result.

Also, our trick with the empty string causes a few duplicates to get included (not very many) so we use set() to get rid of them.

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+1 for teaching me combinations_with_replacement –  andy boot May 2 '13 at 16:08
-1 Skips a lot of numbers... –  Thijs van Dien May 2 '13 at 16:08
Yes, all the ones that meet the requirement of having non-decreasing digits. –  Thijs van Dien May 2 '13 at 16:12
It doesn't include values with fewer than six digits though (except for 0, which should be skipped). That is, 1 won't be included because in a six-digit form, 000001 is not non-increasing. –  Blckknght May 2 '13 at 16:15
Just compare your output with the brute force approach or the algorithm provided by the OP. :) –  Thijs van Dien May 2 '13 at 16:16

How efficient do you want to be?

[i for i in range(10**6) if str(i) == ''.join(sorted(str(i), reverse=True))]

Using itertools:

from itertools import combinations_with_replacement
from string import digits
sorted(int(''.join(reversed(t)))
for n in range(6)
for t in combinations_with_replacement(digits, n)
if not all(d == '0' for d in t))
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I think the standard answer to that is, "more efficient than the brute force approach" :P –  RoadieRich May 2 '13 at 15:30
Would already be quite a bit faster if you write a simple O(n) function rather than using sorted. –  Thijs van Dien May 2 '13 at 15:45

I've not quite figured out why this works, but the intended method is to take a digit, and append it to all the numbers we've already generated that it can fit with - which can be decided by looking at the rightmost digit of the number.

length = 6

digits = range(10)

numbers = digits[1:]
for curNumber in numbers:
for n in range(1 + curNumber%10):
numbers.append(curNumber*10 + n)
if(curNumber == 99999):
break

print numbers
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Just doing it might end up being more efficient (performance-wise):

def xfn():
x, i = [9], 0

while True:
if i == len(x) - 1:
x.insert(i, 0)

if x[i] < x[i+1]:
x[i] += 1
x[0:i] = [0] * i
i -= 1
yield int(''.join(map(str, reversed(x[0:-1]))))
continue

i += 1

itertools.takewhile(lambda x: x < 10 ** 6, xfn())
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