# Numbers between a and b without their permutations

I've written a similar question which was closed I would like to ask not the code but an efficiency tip. I haven't coded but if I can't find any good hint in here I'll go and code straightforward. My question:

Suppose you have a function listNums that take a as lower bound and b as upper bound.

For example a=120 and b=400

I want to print numbers between these numbers with one rule. 120's permutations are 102,210,201 etc. Since I've got 120 I would like to skip printing 201 or 210.

Reason: The upper limit can go up to 1020 and reducing the permutations would help the running time.

Again just asking for efficiency tips.

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Do you have informations about the lower bound? –  Saphrosit Feb 13 '12 at 23:48
Should `222` be printed? –  Lightness Races in Orbit Feb 13 '12 at 23:50
Thank you for the comment. Lower bound can be anything from 1 to 10^20-1. As the Upper bound can be 1 to 10^20 –  Ali Feb 13 '12 at 23:51
@LightnessRacesinOrbit as long as `222` wasn't printed –  Seth Carnegie Feb 13 '12 at 23:51
If x and y are your numbers and y is really high then it is very likely that the number of numbers you want to skip is very low compared to (y-x). Not sure how you can make it more efficient! –  ElKamina Feb 13 '12 at 23:51

I am not sure how you are handling 0s (eg: after outputting 1 do you skip 10, 100 etc since technically 1=01=001..).

The trick is to select a number such that all its digits are in increasing order (from left to right).

You can do it recursively. AT every recursion add a digit and make sure it is equal to or higher than the one you recently added.

EDIT: If the generated number is less than the lower limit then permute it in such a way that it is greater than or equal to the lower limit. If A1A2A3..Ak is your number and it is lower than limit), then incrementally check if any of A2A1A3...Ak, A3A1A2...Ak, ... , AkA1A2...Ak-1 are within limit. If need arises, repeat this step to with keeping Ak as first digit and finding a combination of A1A2..Ak-1.

Eg: Assume we are selecting 3 digits and lower limit is 99. If the combination is 012, then the lowest permutation that is higher than 99 is 102.

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Thanks for the answer but here is one thing. Consider you've selected 99 as lower bound and 150 for the upper bound. Starting from 99,100 is unique,101,102,103,104 etc. So the increasing rule cannot be applied here –  Ali Feb 14 '12 at 0:05
@rolandbishop If the number is lower than the limit, permute it. –  ElKamina Feb 14 '12 at 0:10
I'll check it out. Thank you for your effort –  Ali Feb 14 '12 at 0:18
Skip a number if its digits aren't in increasing order and the previous permutation of those digits is within the bounds. With a fixed number of digits the previous permutation should be constant time to compute. –  bames53 Feb 14 '12 at 0:18

When the lower bound is 0, an answer is given by the set of numbers with non-decreasing digits (0, 1, 2, 3, 4, 5, 6, 7, 8, 9, 11, 12, 13, 14, 15, 16, 17, 18, 19, 22, 23, 24, 25, 26, 27, 28, 29, 33, 34, 35, 36, 37, 38, 39, 44, 45, 46, 47, 48, 49, 55, 56, 57, 58, 59, 66, 67, 68, 69, 77, 78, 79, 88, 89, 99, 111, 112...) that fall in the requested range.

This sequence is easily formed by incrementing an integer, and when there is a carry, replicate the digit instead of carrying. Exemple: 73 is followed by 73+1 = 74 (no carry); 79 is followed by 79+1 = 80 (carry), so 88 instead; 22356999 is followed by 22356999+1 = 22357000, hence 22357777.

``````# Python code
A= 0 # CAUTION: this version only works for A == 0 !
B= 1000

N= A
while N < B:
# Detect zeroes at the end
S= str(N)
P= S.find('0')

if P > 0:
# Replicate the last nonzero digit
S= S[:P] + ((len(S) - P) * S[P-1])
N= eval(S)

# Next candidate
print N
N+= 1
``````

Dealing with a nonzero lower bound is a lot more tricky.

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