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Suppose we have a set of doubles s, something like this:

1.11, 1.60, 5.30, 4.10, 4.05, 4.90, 4.89

We now want to find the smallest, positive integer scale factor x that any element of s multiplied by x is within one tenth of a whole number.

Sorry if this isn't very clear—please ask for clarification if needed.

Please limit answers to C-style languages or algorithmic pseudo-code.


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The scale factor is not necessary an integer or a power of ten, right? – Vlad Dec 5 '10 at 22:30
What would you expect the value of x to be for the example above ? – Paul R Dec 5 '10 at 22:30
By the way, the smallest positive scale factor is zero. Should we consider negative ones as well? – Vlad Dec 5 '10 at 22:31
@Vlad: Right. No real requirements on it of that sort. – Aaron Yodaiken Dec 5 '10 at 22:34
In your example the number is 100 ... – Dr. belisarius Dec 5 '10 at 22:50
up vote 4 down vote accepted

You're looking for something called simultaneous Diophantine approximation. The usual statement is that you're given real numbers a_1, ..., a_n and a positive real epsilon and you want to find integers P_1, ..., P_n and Q so that |Q*a_j - P_j| < epsilon, hopefully with Q as small as possible.

This is a very well-studied problem with known algorithms. However, you should know that it is NP-hard to find the best approximation with Q < q where q is another part of the specification. To the best of my understanding, this is not relevant to your problem because you have a fixed epsilon and want the smallest Q, not the other way around.

One algorithm for the problem is (Lenstra–Lenstra)–Lovász's lattice reduction algorithm. I wonder if I can find any good references for you. These class notes mention the problem and algorithm, but probably aren't of direct help. Wikipedia has a fairly detailed page on the algorithm, including a fairly large list of implementations.

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To answer Vlad's modified question (if you want exact whole numbers after multiplication), the answer is known. If your numbers are rationals a1/b1, a2/b2, ..., aN/bN, with fractions reduced (ai and bi relatively prime), then the number you need to multiply by is the least common multiple of b1, ..., bN.

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This is not a full answer, but some suggestions:

Note: I'm using "s" for the scale factor, and "x" for the doubles.

First of all, ask yourself if brute force doesn't work. E.g. try s = 1, then s = 2, then s = 3, and so forth.s

We have a list of numbers x[i], and a tolerance t = 1/10. We want to find the smallest positive integer s, such that for each x[i], there is an integer q[i] such that |s * x[i] - q[i]| < t.

First note that if we can produce an ordered list for each x[i], it's simple enough to merge these to find the smallest s that will work for all of them. Secondly note that the answer depends only on the fractional part of x[i].

Rearranging the test above, we have |x - q/s| < t/s. That is, we want to find a "good" rational approximation for x, in the sense that the approximation should be better than t/s. Mathematicians have studied a variant of this where the criterion for "good" is that it has to be better than any with a smaller "s" value, and the best way to find these is through truncations of the continued fraction expansion.

Unfortunately, this isn't quite what you need, since once you get under your tolerance, you don't necessarily need to continue to get increasingly better -- the same tolerance will work. The next obvious thing is to use this to skip to the first number that would work, and do brute force from there. Unfortunately, for any number the largest the first s can be is 5, so that doesn't buy you all that much. However, this method will find you an s that works, just not the smallest one. Can we use this s to find a smaller one, if it exists? I don't know, but it'll set an upper limit for brute forcing.

Also, if you need the tolerance for each x to be < t, than this means the tolerance for the product of all x must be < t^n. This might let you skip forward a great deal, and set a reasonable lower limit for brute forcing.

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