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# Reordering numbers

I have numbers in range 1-62 I want to be able to "crypt" them, so that it's hard to guess they are generated in some order.

So, it should be some mapping, for example

1->35 2->19 3->61 ...

so that I have 1 to 1 mapping, 100% reversible.

I can hardcode mapping, but I would prefer math solution to that, some kind of formula which takes number as argument, and produces number in range 1-62, and does NOT generate duplicates. Is there any chance this formula exists?

Just for history, validation script:

``````<?
\$test = array();

\$val = 37;
for(\$i=0;\$i<62;\$i++)
{
if(\$test[(\$i*\$val)%62])
{
print("Collision: \$i ".\$test[(\$i*\$val)%62]."<br/>");
}
\$test[(\$i*\$val)%62] = \$i;
print("\$i => ".((\$i*\$val)%62)."<br/>");
}

?>
``````

Update:

Here are IDs generated thanks to these answers:

``````qpOLHk
NMb84H
aI740D
x5urn0
UsROKn
hPeb7K
EcByu7
1zYVRu
oWlieR
LjIFBe
8G52YB
v3splY
SqPMIl
fNc95I
Cazws5
ZxWTPs
mUjgcP
JhGDzc
6E30Wz
``````

Sweeeeeet :-)

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You could put the numbers 1 to 62 in an array and shuffle the array (for example using the Fisher-Yates shuffle). The index of the array is then mapped to the content of that cell (but be careful of the off-by-one error if you use 0-indexed arrays).

To make it deterministic use a particular seed for the random number generator.

Edit: A less computationally expensive (and also easier to guess) mapping is to multiply by some constant and then calculate the result modulo 62:

``````result = (input * 37) % 62
``````

The number 37 is just an example. You can use any number that is coprime to 62 - that is any odd number apart from 31.

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This goes for hardcoding I was considering. static seed would do, but I afraid it's too much processing, I need something simple... – BarsMonster Dec 12 '10 at 2:50
@BarsMonster: How much processing is allowed? And what part of this algorithm do you see as too expensive? – Mark Byers Dec 12 '10 at 2:56
This would be performed 10'000 times per second in interpreted language. While I see that your solution probably fits in terms of performance, I really like to have something like output = (input+35)%62, but a little bit more random. – BarsMonster Dec 12 '10 at 3:01
@BarsMonster: How about `(input*37) % 62` ? Or `pow(input, 37) % 62`. The latter can be computed quickly using repeated squaring and taking the modulus at each step. And of course add 1 to make the range 1-62 instead of 0-61. – Mark Byers Dec 12 '10 at 3:04
It gives duplicates, for multiple input values same output. – BarsMonster Dec 12 '10 at 3:07

Along the lines of Mark Byers's comment. Find the inverse of `x` mod n (e.g., n=62).

Let `x` be your input integer in the interval `[1, n]`. Use the extended Euclidean algorithm to find `y` and `t` such that `xy + nt = 1 mod n`. Then `y = x^{-1} mod n`.

-
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This looks interesting, but I needed better scrambling... – BarsMonster Dec 12 '10 at 4:21

Use RSA. It's quite easy to implement (well, depends on the language) and here's a worked example.

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Unfortunately, it's output is numbers modulo some big number => I do not see how does it maps each value to some other value without duplicates in specified range. – BarsMonster Dec 12 '10 at 2:51
@BarsMonster: You're right. I didn't see that you needed outputs from 1-62 as well. – Jacob Dec 12 '10 at 2:59